Method for statistical comparison of occupations by skill sets and other relevant attributes

ABSTRACT

A method and system for measuring transferability of workers between and among occupations by means of the mathematical relationships between those occupations&#39; key attributes, as defined by publicly available data on the competencies required as specified by a complete catalog of U.S. occupations known as O*NET. This method provides a concise, informative measurement for comparing the relative requirements of Abilities, Skills, Knowledge, and other relevant attributes of occupations, enabling users to gauge the feasibility of transferring workers from one occupation to another.

This continuation-in-part application claims priority on application Ser. No. 12/318,374 filed Dec. 29, 2008 which claims priority on provisional patent application 61/006,196 filed on Dec. 28, 2007.

TECHNICAL FIELD

This invention is called TORQ—the Transferable Occupation Relationship Quotient. TORQ is a mathematical manipulation of Labor Market Information (LMI) and other data, making use of publicly and privately available databases of key data about workers and occupations in the United States. It responds to a pervasive and continual need among economic developers, workforce development professionals, educators, and others for a useful way to assess the feasibility of transferring from one occupation to another. This invention's method for achieving this measure of “transferability” is based on mathematical relationships, including, but not limited to, statistical correlation of the skills, abilities, knowledge, and other attributes that are vital to each occupation.

BACKGROUND ART

Characterizing and comparing the vital attributes of occupations has been an important part of the field of labor economics for many years. During the past decade, two major databases of occupational information have become the most widely known and used sources of occupation profiles and attribute comparison. Following are detailed descriptions of these two databases, which in turn are key information sources of TORQ, the invention described in this application. Additionally, several other systematic attempts have been made to approach the concept of occupational comparison and job transfer. The most significant of those efforts are described here.

O*NET

O*NET™ refers to the U.S. Department of Labor's Occupational Information Network. O*NET's taxonomy of occupations is an extension of the occupation labels developed by the Bureau of Labor Statistics' Standard Occupational Classification (SOC) system.

For example, as of late 2008, O*NET's database provided detailed data on 809 separate officially defined occupations. Each of these occupations is associated with a set of descriptors according to the O*NET Content Model, derived from detailed observation and analysis of job characteristics of each described occupation. O*NET's database is periodically reviewed and updated to include information on new and emerging occupations. The current version, as of late 2011, is O*NET 16.

The O*NET Content Model includes all six of the domains listed below, together with all of the descriptors there under which are associated with each of O*NET's listed occupations:

-   -   Worker Characteristics—enduring characteristics that may         influence both work performance and the capacity to acquire         knowledge and skills required for effective work performance.         -   Abilities—Enduring attributes of the individual that             influence performance.         -   Occupational Interests—Preferences for work environments.             Occupational Interest Profiles (OIPs) are compatible with             Holland's (1985, 1997) model of personality types and work             environments.         -   Work Values—Global aspects of work composed of specific             needs that are important to a person's satisfaction.             Occupational Reinforcer Patterns (ORPs) are based on the             Theory of Work Adjustment (Dawis & Lofquist, 1984).         -   Work Styles—Personal characteristics that can affect how             well someone performs a job.     -   Worker Requirements—descriptors referring to work-related         attributes acquired and/or developed through experience and         education.         -   Basic Skills—Developed capacities that facilitate learning             or the more rapid acquisition of knowledge         -   Cross-Functional Skills—Developed capacities that facilitate             performance of activities that occur across jobs.         -   Knowledge—Organized sets of principles and facts applying in             general domains.         -   Education—Prior educational experience required to perform             in a job.     -   Experience Requirements—requirements related to previous work         activities and explicitly linked to certain types of work         activities.         -   Experience and Training—If someone were being hired to             perform this job, how much of the following would be             required?         -   Basic Skills—Entry Requirement—Entry requirement for             developed capacities that facilitate learning or the more             rapid acquisition of knowledge.         -   Cross-Functional Skills—Entry Requirement—Entry requirement             for developed capacities that facilitate performance of             activities that occur across jobs.         -   Licensing—Licenses, certificates, or registrations that are             awarded to show that a job holder has gained certain skills.             This includes requirements for obtaining these credentials,             and the organization or agency requiring their possession.     -   Occupation-Specific Information—variables or other Content Model         elements of selected or specific occupations.         -   Tasks—Occupation-Specific Tasks.         -   Tools and Technology—Machines, equipment, tools, software,             and information technology workers may use for optimal             functioning in a high performance workplace.     -   Labor Market Characteristics—variables that define and describe         the general characteristics of occupations that may influence         occupational requirements.         -   Labor Market Information—Information related to economic             conditions and labor force characteristics of occupations.         -   Occupational Outlook—Projections of future economic             conditions and labor force characteristics of occupations.     -   Occupational Requirements—a comprehensive set of variables or         detailed elements that describe what various occupations         require.         -   Generalized Work Activities—General types of job behaviors             occurring on multiple jobs.         -   Detailed Work Activities—Detailed types of job behaviors             occurring on multiple jobs.         -   Organizational Context—Characteristics of the organization             that influence how people do their work.         -   Work Context—Physical and social factors that influence the             nature of work.

The information O*NET provides about each occupation is exhaustive and comprehensive. The multiple dimensions of occupational attributes cataloged by O*NET make the description of each occupation both extremely rich and highly complex. A table listing the major and minor components of the O*NET database and their hierarchical relationships is presented in FIG. 3.

Researchers attempting to make use of the O*NET database have been accordingly limited in their ability to embrace the entire set of data in several kinds of studies involving career transfer and career paths. Most efforts to make productive use of the O*NET database have only encompassed one or a few dimensions of O*NET occupational data, or have merely repackaged O*NET data verbatim within various graphic and/or tabular displays or reports.

WORKKEYS®

Another database of Skills and Abilities by occupation is provided by ACT, Inc. and which is known as WORKKEYS®. WORKKEYS provides a more concise set of groupings of Skills and Abilities—eight (8) groupings in all. Each of these categories—e.g. Applied Mathematics or Locating Information—is rated on a 0-7 scale. Like O*NET's occupational attributes, the information supplied by WORKKEYS is derived from a system of job profiling based on detailed observation and interviewing.

The major advantage of WORKKEYS is that it also features a worker assessment component, whereby individuals take tests to determine their personal skill levels in each of the crucial WORKKEYS dimensions. This component is highly useful to business recruiters and workforce and human resource professionals wishing to match individuals to job opportunities. The combination of career-to-career comparison and individual-to-career comparison has made WORKKEYS a preferred database for occupational information among the world of workforce development, despite the relative thinness of its occupational information compared to O*NET.

Transferable Skills and Gap Analysis

The concept of “transferable skills” has been the subject of a great deal of research and exploration among labor economists as well as among workforce and economic developers. From the workforce development standpoint, evaluating transferable skills has long been the concern of those tasked with finding new employment opportunities for displaced workers, whether individually or in the case of a mass layoff or plant closing. For economic developers, quickly assessing transferable skills present in a region's workforce is important to efforts to recruit and retain businesses.

Additionally, the interests of workforce development would be well served by a reliable method for assessing the skills present in a region's workforce. Much has been made lately of the importance of “skills gap analysis” as a tool for assessing the condition of local workforces, and preparing a region's workforce for 21^(st)-century economy occupations. Most such efforts, however, have found that, while estimating shortages for individual occupations is relatively easy, given plentiful public employment information, it is much more difficult to assess the skills of an area's labor force in a similar way, absent an exhaustive community survey or other such expensive measures.

Career Ladders, Lattices, and Pathways

Related to the idea of skills transfer is the construction of networks that are variously known as career ladders, lattices, and/or pathways. These models of the interconnections between careers in similar fields or requiring similar Skill/Ability/Knowledge sets are designed for and used by guidance and employment counselors and human resources professionals to illustrate the possibilities offered by particular career and/or educational choices.

The various labels for these career maps imply different approaches to the network of career relationships. A career ladder indicates a more or less linear progression of education and experience in jobs of similar natures in the same or similar industries. A career lattice is a more inclusive set of occupations, based on relationships of skills, education levels, abilities, earnings, industries, and many other bases of comparison. A career path or pathway, then, describes any set of interconnected occupations within this larger career lattice.

It has historically been more difficult to construct a career lattice than a career ladder. The career path from a Certified Nursing Assistant to a Registered Nurse is relatively straightforward, but finding occupations with comparable attributes that might supply a need for skilled warehouse workers may be more difficult. Efforts to create career lattices based on observed O*NET or WORKKEYS attributes have been attempted, but none so far has taken a comprehensive view of these attributes with statistical rigor and precision that embraces the entire data set represented by either of these databases.

Competency Modeling

A close relative to the notion of career ladders and pathways is a product called a “competency model.” A U.S. Department of Labor-sponsored project called the “Competency Model Clearinghouse” has produced such models based on the Abilities, Skills, and Knowledge requirements of general employment in broad industry sectors and/or clusters, such as Information Technology, Advanced Manufacturing, and others.

These “competency models” consist of pyramidal representations of the varieties of Abilities, Skills, and Knowledge that are required for any occupation within a given industry sector or cluster. The bottom level of the pyramid contains the most basic “employability” attributes like “interpersonal skills” and “initiative.” Subsequent levels attain more and more specificity to the given industry, examining common knowledge bases required of all Information Technology professionals, for example. In the upper levels of these competency models, occupation-specific job requirements are quoted directly from O*NET.

These competency models do employ a systematic approach to their construction and definition, consisting of consultation with employers within the given industry for which the model has been constructed. This application, however, is by its nature more useful in a broader strategic sense than at the level of individual occupations. At the occupational level, competency models yield no more specific information than does raw O*NET data.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 is a flowchart describing the process by which data are obtained and transformed to compute and store values for the Transferable Occupation Relationship Quotient;

FIG. 2 is a flowchart describing the process of end user interface to retrieve information derived from the Transferable Occupation Relationship Quotient;

FIG. 3 is a detailed table listing the various dimensions of the Department of Labor's O*NET occupational database used to calculate the Transferable Occupation Relationship Quotient;

FIG. 4 is the percent of the original LV that has decayed after the passage of T years which are measured along the X axis;

FIG. 5 is the percent of the decayed value of LV that will be “restored” by the algorithm after the passage of V years on the job which are measured along the X axis; and

FIG. 6 is the numbers for L_(l) ^(o) for the first five occupations in O*NET 16; and

FIG. 7 is a gap analysis graph.

DISCLOSURE OF THE INVENTION

TORQ begins with the statistical principle of correlation, i.e. “a single number that describes the degree of relationship between two variables.” TORQ computations can be performed by means of a computer, software and a database where necessary.

Mathematically, a correlation is computed according to the following formula derived from the Web Center for Social Research Methods, where x and y are the two variables in question:

${{Correl}\left( {X,Y} \right)} = \frac{\sum\limits_{i}^{N^{k}}\left\{ {\left( {x_{i} - \mu_{x}} \right)\left( {y_{i} - \mu_{y}} \right)} \right\}}{\left\lbrack \sqrt{\sum\limits_{i}^{N^{k}}{\left( {x_{i} - \mu_{x}} \right)^{2}{\sum\limits_{i}^{N^{k}}\left( {y_{i} - \mu_{y}} \right)^{2}}}} \right\rbrack}$ The ratio (Correl(X,Y)) produced by this formula is known as a correlation coefficient.

By applying this computation to the complete set of scores—that is, O*NET and WORKKEYS values for element “Levels” and “Importance” of Skills, Abilities, Knowledge, and all other attributes relevant to any two given occupations within the database, the first building block of the TORQ computation is obtained. The multiple dimensions of attribute values in the O*NET and WORKKEYS database (for example; Skills, Abilities, and Knowledge in O*NET or Applied Mathematics and Locating Information in WORKKEYS) each produce their own individual correlation coefficient. The resultant values produced by the correlation algorithm are normalized to a scale of 0 to 100.

Once the correlation coefficients are computed, the process of TORQ calculation continues with an adjustment step which incorporates measures of the individual gaps between all of the composite Level-Importance scores of the Abilities, Skills, and Knowledge attributes (or, as they are termed in O*NET the “elements”) for the pair of occupations being analyzed for which those scores for the destination occupation exceeds those for the source occupation. This aggregate measure is then used to adjust the previously calculated correlation coefficients in order to provide a more precise indication of the relationship between occupations and to create an accurate representation of the asymmetry of transfer between occupations.

The adjusted TORQ scores still take values from 0 to 100. A zero value indicates no significant congruence or lack thereof between occupations' Skills, Abilities, and/or Knowledge; and a value of 100 indicates total congruence. (Obviously, each occupation has a TORQ value of 100 relative to itself for all descriptors.)

It should be noted that TORQ values are calculated for each significant descriptor of occupational attributes being compared, i.e., for Abilities, Skills, Knowledge, etc. There is also a combined measure known as a “Grand TORQ,” which is obtained by taking a weighted average of all the TORQ values for all the individual descriptor categories measured. “Weighted average” indicates that the calculation of the Grand TORQ can be adjusted to reflect the user's sense of priorities concerning the attributes of each pair of occupations, based on a combination of the correlation coefficients described above.

The full articulation of the mathematical process of calculating TORQ follows below.

DETAILED DESCRIPTION OF THE DRAWINGS

The following detailed account describes the procedural steps involved in calculating TORQ and user extraction of information from the TORQ database.

Computation and Creation of the TORQ Database (FIG. 1)

101. Acquire O*NET Data for Each Occupation

The process begins with the acquisition of current occupational profile data from the Department of Labor's online O*NET database (or WORKKEYS or a comparable substitute should O*NET data become unavailable at some point).

102. Load Complete Set of O*NET Data for Each Occupation into Database

These data are then loaded into a database management program for further manipulation. The current database type for TORQ uses the Structured Query Language (SQL). Each occupation in this database is re-indexed according to a simple set of Occupation Numbers (OCCNOs).

103. Select Attribute Dimensions for Entry into TORQ Calculation Matrices

Each occupational descriptor (e.g. Skills) is selected individually, and scores for both Level and Importance for each element within the given descriptor (e.g. “Active Listening” within Skills) are entered. The current active descriptors for TORQ calculation include Abilities, Skills, and Knowledge. Other descriptors may be used to create TORQ calculation matrices as well, in like fashion.

104. Multiply Level and Importance Scores for all Elements in Each Descriptor

Within each descriptor, the product of each element's Importance and Level scores is calculated, creating a “Combined Multiplicative Descriptor” (or CMD”) of for each element within the context of each occupation.

105. Create the TORQ Calculation Matrices

In every descriptor (e.g. Skills) a separate calculation matrix is created, which consists of the CMD scores produced by the multiplication in step (4). Each matrix contains the complete set of these composite scores for every occupation in two dimensions, to allow direct comparison of any occupation with any other. Thus, the dimension of a given descriptor matrix is n×m where n=the number of occupations in the current version of the O*NET database and m=number of individual elements in the given descriptor dimension.

106. Correlate Scores Across all Pairs of Occupations

Then, for every one of these calculation matrices, the correlation process F1 is applied to produce a correlation coefficient.

107. Normalize Correlation Coefficients

Each resulting correlation coefficient is then normalized to a 0 to 100 scale via a linear or other mathematical transformation. This resulting normalized coefficient is the first primary component of the Transferable Occupation Relationship Quotient (TORQ), but this alone does not comprise the final TORQ value.

108 and 109. Refine TORQ Value Through Systematic Evaluation of Gaps

The adjustment of the final TORQ value incorporates measures of the individual gaps between all of the composite Level-Importance scores of the Abilities, Skills, and Knowledge elements for the pair of occupations being analyzed. For this purpose, a second type of “cross” Composite Muliticative Descriptor is computed which we designate as CMD^(TF) and which is computed in the following way:

Consider an occupation from which the transfer is to be made and term that the “FROM” occupation. Consider, also, the occupation to which the transfer is to be made and term that the “TO” occupation. The CMD^(TF) is computed by multiplying the Importance score of the TO occupation times the Level score of the FROM occupation.

For each element, the sum of the differences between the conventional CMD scores for the TO occupation and the CMD^(TF) relevant to the two occupations. However, this summation is made only in those cases for which the CMD for the TO occupation exceeds that of the CMD^(TF). The sum of those differences as so computed is then divided by the sum of CMD for the TO occupation. This aggregate measure (i.e., the ratio produced as just described) is then used to adjust the previously calculated correlation coefficients. This adjustment makes the TORQ value more accurate and useful in at least two important ways:

-   -   First, it corrects the strictly correlation-based calculation by         introducing a quantitative measure of the asymmetry between the         transferability between members of pairs of occupations. In the         usual case, the measure of the transferability (i.e., the TORQ)         of a worker in occupation “A” to occupation “B” is not the same         as the TORQ in the opposite direction, i.e., from “B” to “A.”         The transferability of a paralegal to become a lawyer, for         example, is not the same as that of a lawyer transferring to         become a paralegal. Taking account of the gaps in the         occupational attributes as described above ensures that this         asymmetry will be reflected in the TORQ values. (In other words,         the TORQ value will not be the same for the paralegal→lawyer         transition as it would for the lawyer→paralegal transition.)     -   Second, it accounts for the rare but problematic instances in         which the composite Level-Importance scores of two occupations         are highly correlated but where large and uniform gaps exist         between the two sets of scores. In such cases, a high         correlation coefficient taken by itself is a spurious indicator         of the actual transferability of workers. If two occupations         require similar ASKs (Abilities, Skills, and Knowledge) but         there exist consistently large gaps in the scores required         between the two across the entire range of ASKs, then a mere         correlation coefficient would look similar for these two         occupations as it would for two which are genuinely closely         related and present a real possibility for transfer. Adjusting         the correlation coefficient by applying a measure of the         attribute gaps between the two occupations' scores minimizes the         possibility that the final TORQ will indicate a spurious degree         of transferability.         110. Acquire and Synchronize Related Labor Market Information by         Occupation

Separately, other labor market information (LMI) is downloaded and stored, and catalogued by the OCCNO of each occupation, to provide matches for each occupation in the TORQ database. This LMI set includes such indicators as prevailing median wages for occupations, estimates of current and projected future regional employment in each occupation, and a wide variety of other information at the national, state, and region-specific levels.

The scope and variety of LMI included in these datasets is determined partially by the set of end users making use of TORQ, and their geographic areas of interest. Currently TORQ uses LMI databases from the national Occupation and Employment Survey (OES) for detailed current information, and state and local information supplied by clients at those levels for purposes of maximum local relevance and the provision of employment projections for estimates of future occupational change.

111. Create TORQ Master Database

Once calculated, TORQ values for every available pair-wise combination of occupations, along every comparable attribute set (e.g. Abilities, Skills, Knowledge, etc.), are stored in a complete database which also contains the catalogued accompanying LMI values for each OCCNO-listed occupation.

112. Update Calculations and LMI

Periodically, updates are supplied to the data upon which TORQ relies for calculation of TORQ values itself—i.e. new editions of O*NET—and for the labor market information which accompanies the occupations in this database. These data sources are monitored regularly and used to refresh the TORQ database of occupational information whenever the source data are renewed. As of the filing of this patent application, TORQ uses values from O*NET version 15, pending the inventor's review of possible irregularities in the new O*NET version 16 released in 2011. Also, new state and sub-state-level clients supply current, local relevant labor market information to use with their own TORQ operations—supplied through the TORQ online user interface.

End User Retrieval of TORQ Database Information (FIG. 2)

201. End User Interactive Access

An end user accessing the TORQ database interacts with it through a front-end software application. This application currently takes the form of a Web-based interface, customized for use by different types of users, which can access TORQ database information over the Internet via a central server which stores and updates TORQ data.

202. Begin User Loop

This begins the sequence of activity for any analytical exercise within the TORQ interactive system.

203. User Actions Querying TORQ Database

This end user application allows the user to query the TORQ database for TORQ values based on pairs of occupations, and on analysis of the TORQ relationships between one occupation and a number of promising alternatives for transfer, via various major tools and sections of the online TORQ user interface. Users may also adjust the output from the database upon the basis of controls for the sensitivity of data to the user's specified criteria. Different types of users will have access to different sets of data controls, depending on the kinds of labor market information relevant to their interests. (A labor economist, for example, may make use of a wider range of statistical sensitivity controls than a career counselor, and might make use of data tools more relevant to long-term strategic analysis than immediate tactical transfer options.)

204. TORQ System Database Query and Report Generation

After receiving instructions for data retrieval and sensitivity controls, the TORQ database produces a report of TORQ values and all specified LMI for the occupations and other data input by the end user.

205. Display Results of Query and LMI Analysis

This report is displayed on the user's screen, in a format which can be printed, saved, etc. according to the user's preference.

206. User Hard Copy Output Generation

The user may choose to produce a hard copy of the output generated by the TORQ system, which may be done in a variety of ways.

207 and 208. Repeat Analysis and User Logoff

The querying and reporting process can be repeated for as many iterations and variations on analysis as the user prefers before ending the user loop.

Contents of the O*NET Database Used by TORQ (FIG. 3)

This figure describes the major portions of the O*NET spectrum of occupational information and their various subdivisions and data contents:

Domains (301): Describes the “domain” of occupational information to which various sets of attributes belong. (This corresponds with the O*NET list of domains cited above in the “Background Art” section.)

Descriptors (302): This lists the sets of major groupings of occupational attributes within each domain.

Elements (303): Descriptions of the various subdivisions of information within each “Descriptor” group. These include:

-   -   303 a Major Categories—Number of major divisions of the         “Descriptor” group.     -   303 b Minor Categories—Number of subdivisions of the Major         Categories.     -   303 c Number—the total number of attributes (or “elements”)         listed within the “Descriptor” group.

Data Entries (304): Descriptions of the type of data reported by O*NET within each “Descriptor” group. These include:

-   -   304 a Level—An O*NET-defined “Level” of each attribute measured         for the occupation in question. (e.g. the level of night vision         required by a truck driver)     -   304 b Importance—The O*NET-defined “Importance” value assigned         to each attribute to the occupation in question. (For example,         night vision is not very important for an accountant.)     -   304 c Data Value—A data value that exists on its own scale         (independent of O*NET's ranking system). (For example, education         levels are defined as High School Graduate, BA/BS Degree, etc.)

Notes re: O*NET 12 (305): Pertains to the status of each data component in the developing new release of the O*NET database, which will form the updated and expanded library of information for TORQ computation upon its release. (As previously noted, TORQ is designed to runs on the most recent version of the O*NET database, but is not limited to the O*NET database.) A further distinguishing characteristic of TORQ is that it allows each group of users (“clients”) to use databases of its own choice. For example, one client group could prefer that its TORQ results should be computed using O*NET 15 while another would prefer results from O*NET*16.

Articulation of Mathematical TORO Calculation Process

The full process of mathematical computation of the Transferable Occupation Relationship Quotient is articulated below. This process provides the mathematical basis for component (106) of FIG. 1, the mathematical correlation process that feeds the initial TORQ computation flow chart.

Definitions of Symbols:

V denotes the sequential number of the most current version of the O*NET database. As explained before, TORQ seeks to use the latest version O*NET. The Examples below use O*NET 12 so the value of V is 12.

Symbols and Definitions for Occupations:

O^(v) equals the number of occupations for which data are supplied in the v^(th) version of the O*NET database. Circa late 2007, O^(v)≡O¹².

O¹²=801

^(OCCNO)O^(v) denotes the occupation with “Occupation Number” (or OCCNO) in O^(v) and. Its value goes from 1 to O^(v).

-   -   For example, in O*NET12, the first occupation listed in the         database (i.e., OCCNO=1) carries the SOC code of 11-1011.00         which corresponds to “Chief Executives.” The last occupation         listed in O*NET12 (i.e., OCCNO=801) carries the SOC code of         53-7121.00 which corresponds to “Tank Car, Truck, and Ship         Loaders.”         Symbols and Definitions for Descriptors, Elements and Scores:         For every ^(OCCNO)O^(v)∃D^(v) a set of O*NET descriptors (e.g.,         “Abilities;” “Skills;” Knowledge;”) in the v^(th) version of the         O*NET database.         ^(v)M equals the number of O*NET descriptors (e.g., “Abilities;”         “Skills;” “Knowledge;”) in the v^(th) version of the O*NET         database plus the number of CMDs computed as described below.         ¹²M=24. A complete list of the 21 descriptors in O*NET12 is         displayed in FIG. 3, plus three CMDs for Abilities, Skills and         Knowledge.

For each descriptor ^(d)D^(v)εD^(v), (d=1, 2, . . . , ^(v)′M), ∃ a set of elements which represent

attributes of that descriptor. For example, for the descriptor called “Abilities” in O*NET12, there exist 52 elements with data for scores beginning with “Oral Comprehension” and continuing with “Written Comprehension,” “Oral Expression” and so on for 49 more elements.

For each element in each descriptor, there exists one or more sets S^(k) consisting of N^(k)

scores where S^(k)

x_(i), (i=1, 2, . . . , N^(k)).

To illustrate, in O*NET12, for each of the elements for Abilities, Skills and Knowledge there exist two sets of scores, one for “Level” and the second for “Importance.”

Additionally, by multiplying the values for Level and Importance we obtain a third measure which we term the “Combined Multiplicative Descriptor” or “CMD” for each element.

And therefore, where:

OCCNO=1 which translates to “Chief Executives”

v=12;

d=Abilities;

k=Level

i=1 meaning “Oral Comprehension”

So, x₁εS^(k) is equal to 5.50 which is the Level score for Oral Comprehension for Chief

Executives in O*NET12.

Similarly, when k=Importance, we have x₁εS^(k) equal to 4.92 which is the Importance score for

Oral Comprehension for Chief Executives in O*NET 12.

Finally, for the “Combined Multiplicative Descriptor” or “CMD” for Oral Comprehension for Chief Executives in O*NET 12, we compute the product of Level times Importance. For the element of Oral Comprehension for Chief Executives in O*NET 12, we obtain value for the CMD as 5.50 times 4.92=27.06.

Finally, as previously noted, for each pair of TO-FROM occupations, we also compute a “cross” composite multicative descriptor which we denote as CMD^(TF). The CMD^(TF) is computed by multiplying the Importance score of the TO occupation times the Level score of the FROM occupation. Note that TORQ correlation analysis employs only the conventional CMD. The CMD^(TF) is used only in the “gap analysis” previously described.

To illustrate the computation of the CMD^(TF) consider a contemplated transfer FROM a Funeral Director (O*NET code 11-9061.00) to Chief Executive (O*NET code 11-1011.00). In O*NET 12, the Oral Comprehension Level score for Funeral Director is 3.88 while the Oral Comprehension Importance score for Chief Executive is 4.92. Therefore, the CMD^(TF) in this case would be 3.88 times 4.92=19.09. Incidentally, the “gap” between the conventional CMD for Chief Executive's Oral Comprehension (i.e., 27.06) and the CMD^(TF) in this case would be 7.97. That would indicate that Funeral Directors' Oral Comprehension, as viewed through the “eyes” of Chief Executive's Importance comes up considerably short. It is this type of “gap” measure that the TORQ algorithm employs to adjust the correlation coefficients between the conventional CMDs of the two occupations.

Working with Matrices from O*NET in TORQ

Recall that for each element in each descriptor, there exists one or more sets S^(k) consisting of N^(k) scores where S^(k)

x_(j), (j=1, 2, . . . , N^(k)). In most cases, there are two such sets for each descriptor (Level and Importance). The number of scores in the O*NET database is very large and TORQ builds two 801×801 matrices for each descriptor S^(k) and for each type of data provided (e.g., Level, Importance, etc.). To illustrate, among the matrices from O*NET12, TORQ builds these:

-   -   For the Abilities descriptor alone, there are 52 Level scores         and 52 Importance Scores. Each of these creates a matrix in the         working database of dimension 801×52. Each of those contains         42,453 individual scores.     -   For Occupational Interests, there are 6 scores for Level which         produces a matrix of dimension 801×6 containing 4,806 scores.     -   For Work Values, there are 21 scores for Level which gives a         matrix of dimension 801×21 containing 16, 821 scores.     -   For Work Styles, there are 16 Importance scores which gives a         matrix of dimension 801×16 containing 12,816 scores.     -   For Basic Skills, there are 10 scores each for Level and         Importance which gives two matrices of dimension 801×10. Each of         these contains 8,010 scores.     -   For Cross-Functional Skills, there are 25 scores each for Level         and Importance which gives two matrices of dimension 801×25         containing 20,025 scores each.     -   For Knowledge, there are 33 scores each for Level and Importance         which gives two matrices of dimension 801×33 containing 26,433         scores each.     -   For Abilities, Skills, and Knowledge, the scores for Level and         Importance are multiplied to produce three synthetic descriptors         called “Combined Multiplicative Descriptors” (or “CMDs”) each of         which has the same dimensions as the original descriptor.         Formula for Computing the Correlation Coefficients

For every descriptor or CMD, ^(d)D^(v)εD^(v), let X and Y represent two vectors in a set, S^(k), of scores for the x^(th) and y^(th) occupations where both x and y run from 1 to O^(v) (which, for O*NET12 would be from 1 to 801). Then the Correlation Coefficient for that pair [abbreviated Correl(X,Y)] is computed in TORQ as follows:

${{Correl}\left( {X,Y} \right)} - \frac{\sum\limits_{i}^{N^{k}}\left\{ {\left( {x_{i} - \mu_{x}} \right)\left( {y_{i} - \mu_{y}} \right)} \right\}}{\left\lbrack \sqrt{\sum\limits_{i}^{N^{k}}{\left( {x_{i} - \mu_{x}} \right)^{2}{\sum\limits_{i}^{N^{k}}\left( {y_{i} - \mu_{y}} \right)^{2}}}} \right\rbrack}$ Where: x_(i)εX and y_(i)εY, i=1 . . . , N^(k) and (j=1, 2, . . . , N^(k));

$\mu_{x} = \frac{\sum\limits_{i}^{N^{k}}\left\{ x_{i} \right\}}{N^{k}}$ (i.e., the mean value of the X vector) and

$\mu_{y} = \frac{\sum\limits_{i}^{N^{k}}\left\{ y_{i} \right\}}{N^{k}}$ (i.e., the mean value of the Y vector).

For each descriptor or CMD, ^(d)D^(v)εD^(v), for which scores exist in the current version of the

O*NET

database (for Level, Importance, or other data value), TORQ computes correlation coefficients as just described for every pair of the O^(v) occupations. These correlation coefficients may range in value from −1 to +1.

Normalization of the Correlation Coefficients

TORQ “normalizes” each correlation coefficient by multiplying it by 100 (or otherwise linearly transforming it). For each descriptor, therefore, the computation and this normalization produce a square matrix of correlation coefficients of dimension 801×801 that is symmetric around its diagonal axis.

For example, if a given user of TORQ based on ONET12 preferred to analyze only the descriptors of Abilities, Skills and Knowledge (rather than the entire gamut of O*NET descriptors) then there would be nine matrices of correlation coefficients, each of dimension of 801×801. They would be for the Level and Importance of the three descriptors selected for analysis plus an additional matrix of CMD correlation coefficients corresponding to the original three descriptors. Obviously, the number of matrices of correlation coefficients increases in proportion to the number of descriptors chosen for analysis.

Illustration of TORQ Calculation Based on Existing O*NET Occupational Attributes

To illustrate the procedure described above, consider how the Abilities Importance correlation coefficient is computed for one pair of occupations, namely Cardiovascular Technologists and Technicians (SOC 29-2031.00) and Registered Nurses (29-1111.00).

Step 1:

Download the latest O*NET database which, for the purposes of this illustration, is O*NET 12.0 Database and is to be found on the Internet. Store these data in a local database editor and/or spreadsheet program.

Step 2:

Retrieve the Abilities Importance and Level Scores for both occupations.

Step 3:

Standardize the original Data Value according to the following formula as provided by O*NET.

The Level and Importance scales each have a different range of possible scores. Ratings on Level were collected on a 0-7 scale, ratings on Importance were collected on a 1-5 scale, and ratings on Frequency were collected on a 1-4 scale. To make reports generated by O*NET Online more intuitively understandable to users, descriptor average ratings were standardized to a scale ranging from 0 to 100. The equation for conversion of original ratings to standardized scores is: S=((O−L)/(H−L))*100 where S is the standardized score, O is the original rating score on one of the three scales, L is the lowest possible score on the rating scale used, and H is the highest possible score on the rating scale used. For example, an original Importance rating score of 3 is converted to a standardized score of 50 (50=[[3−1]/[5−1]]*100). For another example, an original Level rating score of 5 is converted to a standardized score of 71 (71=[[5−0]/[7−0]]*100).

In this case, S=((Original Data Value−1)/4. The original and standardized values for the Importance Scores of the various Abilities element of O*NET coded occupations 29-1111.00 and 29-2031.00 are shown in the following table:

O*NET O*NET Stan- Occupation Element Orig- dard- Code Code Element Title inal ized 29-1111.00 1.A.1.a.1 Oral Comprehension IM 4.25 81.3 Written 29-1111.00 1.A.1.a.2 Comprehension IM 3.88 72.0 29-1111.00 1.A.1.a.3 Oral Expression IM 4.63 90.8 29-1111.00 1.A.1.a.4 Written Expression IM 4 75.0 29-1111.00 1.A.1.b.1 Fluency of Ideas IM 2.5 37.5 29-1111.00 1.A.1.b.2 Originality IM 2.38 34.5 29-1111.00 1.A.1.b.3 Problem Sensitivity IM 4.75 93.8 29-1111.00 1.A.1.b.4 Deductive Reasoning IM 4 75.0 29-1111.00 1.A.1.b.5 Inductive Reasoning IM 4.25 81.3 29-1111.00 1.A.1.b.6 Information Ordering IM 3.5 62.5 29-1111.00 1.A.1.b.7 Category Flexibility IM 3 50.0 Mathematical 29-1111.00 1.A.1.c.1 Reasoning IM 1.88 22.0 29-1111.00 1.A.1.c.2 Number Facility IM 1.63 15.8 29-1111.00 1.A.1.d.1 Memorization IM 2.63 40.8 29-1111.00 1.A.1.e.1 Speed of Closure IM 3 50.0 29-1111.00 1.A.1.e.2 Flexibility of Closure IM 3.25 56.3 29-1111.00 1.A.1.e.3 Perceptual Speed IM 2.63 40.8 29-1111.00 1.A.1.f.1 Spatial Orientation IM 1.38 9.5 29-1111.00 1.A.1.f.2 Visualization IM 1.75 18.8 29-1111.00 1.A.1.g.1 Selective Attention IM 3.5 62.5 29-1111.00 1.A.1.g.2 Time Sharing IM 3.25 56.3 29-1111.00 1.A.2.a.1 Arm-Hand Steadiness IM 3 50.0 29-1111.00 1.A.2.a.2 Manual Dexterity IM 3.13 53.3 29-1111.00 1.A.2.a.3 Finger Dexterity IM 2.38 34.5 29-1111.00 1.A.2.b.1 Control Precision IM 2.25 31.3 Multilimb 29-1111.00 1.A.2.b.2 Coordination IM 2.25 31.3 29-1111.00 1.A.2.b.3 Response Orientation IM 1.88 22.0 29-1111.00 1.A.2.b.4 Rate Control IM 1.13 3.3 29-1111.00 1.A.2.c.1 Reaction Time IM 2 25.0 29-1111.00 1.A.2.c.2 Wrist-Finger Speed IM 1.25 6.3 Speed of Limb 29-1111.00 1.A.2.c.3 Movement IM 1.88 22.0 29-1111.00 1.A.3.a.1 Static Strength IM 2.38 34.5 29-1111.00 1.A.3.a.2 Explosive Strength IM 1.38 9.5 29-1111.00 1.A.3.a.3 Dynamic Strength IM 1.75 18.8 29-1111.00 1.A.3.a.4 Trunk Strength IM 3.38 59.5 29-1111.00 1.A.3.b.1 Stamina IM 2.63 40.8 29-1111.00 1.A.3.c.1 Extent Flexibility IM 2.75 43.8 29-1111.00 1.A.3.c.2 Dynamic Flexibility IM 1.13 3.3 Gross Body 29-1111.00 1.A.3.c.3 Coordination IM 2.63 40.8 Gross Body 29-1111.00 1.A.3.c.4 Equilibrium IM 1.63 15.8 29-1111.00 1.A.4.a.1 Near Vision IM 3.63 65.8 29-1111.00 1.A.4.a.2 Far Vision IM 2.13 28.3 Visual Color 29-1111.00 1.A.4.a.3 Discrimination IM 2.13 28.3 29-1111.00 1.A.4.a.4 Night Vision IM 1 0.0 29-1111.00 1.A.4.a.5 Peripheral Vision IM 1 0.0 29-1111.00 1.A.4.a.6 Depth Perception IM 2.13 28.3 29-1111.00 1.A.4.a.7 Glare Sensitivity IM 1 0.0 29-1111.00 1.A.4.b.1 Hearing Sensitivity IM 2 25.0 29-1111.00 1.A.4.b.2 Auditory Attention IM 2.38 34.5 29-1111.00 1.A.4.b.3 Sound Localization IM 1 0.0 29-1111.00 1.A.4.b.4 Speech Recognition IM 4 75.0 29-1111.00 1.A.4.b.5 Speech Clarity IM 4 75.0 29-2031.00 1.A.1.a.1 Oral Comprehension IM 4 75.0 Written 29-2031.00 1.A.1.a.2 Comprehension IM 3.38 59.5 29-2031.00 1.A.1.a.3 Oral Expression IM 3.88 72.0 29-2031.00 1.A.1.a.4 Written Expression IM 3.25 56.3 29-2031.00 1.A.1.b.1 Fluency of Ideas IM 2.88 47.0 29-2031.00 1.A.1.b.2 Originality IM 3 50.0 29-2031.00 1.A.1.b.3 Problem-Sensitivity IM 4 75.0 29-2031.00 1.A.1.b.4 Deductive Reasoning IM 3.63 65.8 29-2031.00 1.A.1.b.5 Inductive Reasoning IM 3.63 65.8 29-2031.00 1.A.1.b.6 Information Ordering IM 3.63 65.8 29-2031.00 1.A.1.b.7 Category Flexibility IM 3.13 53.3 Mathematical 29-2031.00 1.A.1.c.1 Reasoning IM 2.63 40.8 29-2031.00 1.A.1.c.2 Number Facility IM 2.63 40.8 29-2031.00 1.A.1.d.1 Memorization IM 2.75 43.8 29-2031.00 1.A.1.e.1 Speed of Closure IM 2.75 43.8 29-2031.00 1.A.1.e.2 Flexibility of Closure IM 3.13 53.3 29-2031.00 1.A.1.e.3 Perceptual Speed IM 3.5 62.5 29-2031.00 1.A.1.f.1 Spatial Orientation IM 1.13 3.3 29-2031.00 1.A.1.f.2 Visualization IM 2.88 47.0 29-2031.00 1.A.1.g.1 Selective Attention IM 3.38 59.5 29-2031.00 1.A.1.g.2 Time Sharing IM 3 50.0 29-2031.00 1.A.2.a.1 Arm-Hand Steadiness IM 2.88 47.0 29-2031.00 1.A.2.a.2 Manual Dexterity IM 2.63 40.8 29-2031.00 1.A.2.a.3 Finger Dexterity IM 3 50.0 29-2031.00 1.A.2.b.1 Control Precision IM 2.88 47.0 Multilimb 29-2031.00 1.A.2.b.2 Coordination IM 2.63 40.8 29-2031.00 1.A.2.b.3 Response Orientation IM 2.38 34.5 29-2031.00 1.A.2.b.4 Rate Control IM 1.88 22.0 29-2031.00 1.A.2.c.1 Reaction Time IM 2.38 34.5 29-2031.00 1.A.2.c.2 Wrist-Finger Speed IM 1.88 22.0 Speed of Limb 29-2031.00 1.A.2.c.2 Movement IM 2 25.0 29-2031.00 1.A.3.a.1 Static Strength IM 2.38 34.5 29-2031.00 1.A.3.a.2 Explosive Strength IM 1.13 3.3 29-2031.00 1.A.3.a.3 Dynamic Strength IM 1.88 22.0 29-2031.00 1.A.3.a.4 Trunk Strength IM 2.13 28.3 29-2031.00 1.A.3.b.1 Stamina IM 2.25 31.3 29-2031.00 1.A.3.c.1 Extent Flexibility IM 2.25 31.3 29-2031.00 1.A.3.c.2 Dynamic Flexibility IM 1 0.0 Gross Body 29-2031.00 1.A.3.c.3 Coordination IM 2.25 31.3 Gross Body 29-2031.00 1.A.3.c.4 Equilibrium IM 2 25.0 29-2031.00 1.A.4.a.1 Near Vision IM 3.88 72.0 29-2031.00 1.A.4.a.2 Far Vision IM 2.88 47.0 Visual Color 29-2031.00 1.A.4.a.3 Discrimination IM 3 50.0 29-2031.00 1.A.4.a.4 Night Vision IM 1.13 3.3 29-2031.00 1.A.4.a.5 Peripheral Vision IM 1.13 3.3 29-2031.00 1.A.4.a.6 Depth Perception IM 2.63 40.8 29-2031.00 1.A.4.a.7 Glare Sensitivity IM 1 0.0 29-2031.00 1.A.4.b.1 Hearing Sensitivity IM 2.88 47.0 29-2031.00 1.A.4.b.2 Auditory Attention IM 2.63 40.8 29-2031.00 1.A.4.b.3 Sound Localization IM 1.13 3.3 29-2031.00 1.A.4.b.4 Speech Recognition IM 3.75 68.8 29-2031.00 1.A.4.b.5 Speech Clarity IM 3.88 72.0

Step 4:

Compute the mean values of the Standardized Values for each occupation and find their product.

Thus, taking as Standardized Values for Cardiovascular Technologists and Technicians (SOC 29-2031.00) as the X vector, we compute the mean value of the X vector:

$\mu_{x} = \frac{\sum\limits_{i}^{52}\left\{ x_{i} \right\}}{52}$ to be 46.4

And, taking Registered Nurses (SOC 29-1111.00) as the Y vector, we compute the mean value of the Y vector as:

$\mu_{y} = \frac{\sum\limits_{i}^{52}\left\{ y_{i} \right\}}{52}$ to be 39.1.

Step 5:

Compute the variations of the values from their means and then, one by one, multiply the two variations, and finally sum their products.

${\sum\limits_{i = 1}^{52}\left\{ {\left( {x_{i} - \mu_{x}} \right)\left( {y_{i} - \mu_{y}} \right)} \right\}} = {24\text{,}035}$

Step 6:

Compute the sums of the squared variations of the values from their means, multiply the two sums, and then extract the square root of the product. √{square root over ((Σ_(i) ⁵²(x _(i)−μ_(x))²)(Σ_(i) ⁵²(y _(i)−μ_(y))²))}{square root over ((Σ_(i) ⁵²(x _(i)−μ_(x))²)(Σ_(i) ⁵²(y _(i)−μ_(y))²))}=√{square root over ((22,689.58 times 34,118.43))}=27,823.24

Step 7:

Compute the correlation coefficient which is the quotient of the values obtained in steps 5 and 6, i.e., CORREL(X,Y)=24,035/27,823.24=0.8638

Step 8:

“Normalize” the correlation coefficient by multiplying it by 100 to produce the TORQ for Abilities Importance for these two occupations. NORMCORREL_(Importance) ^(Abilities)=100 times 0.8638=86.38. Comments on the example:

-   -   1. Often, during the application of TORQ to problem situations,         the occupation represented by the X vector is taken to mean the         occupation from which workers could be transitioned to the         occupation represented by the Y vector. In case, the analysis         would be that of examining the congruence of Cardiovascular         Technologists and Technicians (SOC 29-2031.00) and Registered         Nurses (29-1111.00) with the idea of advancing the former (whose         values are represented by the X vector) into the latter (whose         values are represented by the Y vector).     -   2. As standard TORQ procedure, a computation of the correlation         coefficient identical to that described in the example is also         carried on using the CMDs of the two occupations and also only a         subset of the Standard Values. That subset uses only those pairs         of values for which the Standardized Values of the Y vector is         greater than zero. In such a computation for these two         occupations, we have         NORMCORREL_(Importance) ^(Abilities)=1.00 times 0.8286=82.86.     -   3. The TORQ computations compute one (or more when the non-zero         subsets of the Standard Values are used) matrix of normalized         correlation coefficients for each O*NET descriptor listed in         Table 1 or CMD for which data values (e.g., for Level and         Importance) exist in the O*NET database. As an example, for         O*NET12, therefore, there are 801 occupations and coefficients         such as those produced in this example must be produced for each         pair of occupations. That means that there are 801²=646,601         cells in each matrix. The computations as described in this         example are sufficient to fill a single cell in such a matrix.     -   4. To properly reflect probable asymmetries between the         transferability of workers between any pair of occupations, the         following adjustments are made to the correlation coefficients         for each O*NET descriptor or Combined Multiplicative Descriptor         (“the descriptor”). Let the symbol “d” denote a specific         descriptor.         -   a. Denote the following:             -   i. The “FROM” or “source” occupation is that from which                 it is proposed that one or more workers should be                 transferred.             -   ii. The “TO” or “destination” occupation is that to                 which the aforementioned workers are to be transferred.             -   iii. A equals the total number of attributes for the                 descriptor “d”.         -   b. N equals the number of positive differences, i.e., the             number of attributes (or “elements”) of the given descriptor             “d” for which the conventional CMD score of the “TO”             occupation exceeds the value of the cross CMD^(FT) for the             “FROM-TO” pair of occupations.             -   i. P⁺ the percent of differences that are positive,                 i.e., N/A expressed as a percent.             -   ii. NORMCORREL^(d) equals the normalized simple                 correlation coefficient between the CMDs of the FROM and                 TO occupations, computed for the descriptor as described                 above herein.             -   iii. P^(C) equals the “Proximity Coefficient” which is                 the ratio of the sum of the scores of the “CMD^(FT)”                 occupation to the sum of the scores of conventional CMD                 of the “TO” occupation, but only for those attributes                 for which the score of the “TO” occupation exceeds that                 of the “FROM” occupation.             -   iv. Δ equals 1−P^(C), i.e., One minus the Proximity                 Coefficient.             -   v. Ω equals 1−P⁺, i.e., One minus the percent of                 differences that are positive.             -   vi. Γ equals Δ*Ω which is the addition to be made to                 P^(C).             -   vii. ^(A)P^(C) equals P^(C)+Γ which is the Adjusted                 Proximity Coefficient.             -   viii. TORQ^(d) equals (NORMCORREL^(d)+^(A)P^(C)) which                 is the TORQ score for descriptor d properly adjusted to                 reflect the asymmetry of the reciprocal measures of                 transferability of workers between the FROM occupation                 and the TO occupation.                 Comments and Observations on Usage and Interpretation of                 TORQ

Certain Abilities scores may be key limiting factors for the feasibility of occupational transfer. Some Abilities, unlike most Skills and Knowledge, are simply inherent qualities that are not responsive to training, education, or other adjustments. Some jobs require certain Abilities that constitute critical limiting factors. (The example of night vision for truck drivers is one such ability.) To generate a useful comparison between occupations, then, these limiting factors must be taken into account—in other words, these specific limiters must be observed along with the TORQ values in order to determine the utility of TORQ in assessing the feasibility of job transfer. (An individual accountant may have perfectly good night vision, rendering the comparison between the typical abilities of an accountant and a truck driver in this dimension irrelevant to the feasibility of his transition to become a truck driver.) A further dimension of the reporting systems associated with TORQ is in development to “flag” these limiting factors and screen them in a way that makes TORQ analysis more nuanced and more useful.

A related the point above—TORQ analysis generally yields the most useful results in job comparisons where relative Skills and Knowledge levels matter. Abilities, as already noted, tend to be less flexible for individuals than levels of skill and knowledge. (For example, doctors in general practice and those who perform surgery may have very closely comparable Skills, Knowledge, and even education levels. Some of the only vital distinguishing factors between these two may happen to be in the Level and Importance of manual dexterity required of a surgeon. Abilities TORQ analysis might therefore show that the feasibility of transfer between the general practitioner and the surgeon may be low, whereas an individual general practitioner may have all the manual dexterity she needs to facilitate a job change to surgeon. The same kind of comparison would hold true for two occupations in which Skills and Knowledge levels are comparably very low. Therefore, Skills and Knowledge TORQs are more useful to those seeking to assess training needs for job transfer, for reasons ranging from relocation of dislocated workers to recruitment of new job candidates from an existing labor pool.

Three Additional Analysis Steps

For more accurate calculations, additional analysis steps may be performed to the general TORQ analysis.

1) A method for using a computer to adjust the occupational attribute values imputed to an individual who has experience in one or more occupations based on the time he or she performed the occupation and the time elapsed since he or she worked in such an occupation;

2) A method for statistical analysis of the combined occupational attribute values of multiple past occupations, and for comparison of these composite attribute values with the attribute values of any other occupation; and

3) A method for the statistical evaluation of groups of workers based on combining, evaluating, and ranking the skill sets and other relevant attributes of all of the workers in a geographic area, industry, or other grouping, based on the occupations that these workers currently hold, or have previously held, or are projected to hold at some future time.

Analysis 1

A method for using a computer to statistically evaluate a set of occupational skills imputed to an individual who has experience in one or more occupations, taking into account changes in these skills as a result of time spent in the occupation or time elapsed since performing the occupation.

Individuals who have performed a range of tasks and work activities in a given occupation may be assumed to be competent in the skills required to do these tasks or activities. This assumed competency may decline over time if the individual ceases to perform the occupation, either because the competencies required for the occupation may change (for example, a heart surgeon may need to learn to use laser “scalpels” that were unknown during his or her medical residency) or because the individual may forget specific knowledge that is important to performance on the job (e.g., translating into a foreign language), or because the individual's abilities may decline with age (e.g., a driver whose night vision deteriorates). The rate at which such declines occur may vary based on factors such as how long the individual has held a job (and thereby learned the skills needed for the job), or how fast technology is changing in a given occupation. The total decline in an occupational competency may vary based on how long it has been since the individual left the occupation. The method described below integrates and statistically analyzes the impacts of these time factors.

Analysis 2

A method for statistical analysis of the combined occupational attribute values of multiple past occupations, and for comparison of these composite attribute values with the attribute values of any other occupation.

During the course of a lifetime, individuals may hold many jobs in various occupations that require different competencies and worker attributes. This multi-occupational history can be statistically analyzed and evaluated to provide a composite description of the occupational attributes that may be imputed to the individual based on his or her entire work history. This composite method involves selecting the highest of the adjusted values for an occupational attribute for each occupation an individual may have held.

A Mathematical Description of Analyses 1 and 2

Analysis 1 (which adjusts occupational attribute values based on time in, or away from an occupation) can be combined with Analysis 2 (which evaluates multiple past occupations) to create a method that provides a more accurate statistical description of the occupational attributes possessed by individuals with a particular work history. These more accurate statistical descriptions of individual occupational attributes can be used to evaluate the feasibility of transfers by individuals into new occupations based on the combined skills they have acquired and retained from previous occupations.

As described below, a combination of Analyses 1 and 2 is applied to data from the US Department of Labor O*NET databases that describe the Knowledge, Skills and Abilities of each occupation. The statistical method described in Analyses 1 and 2 can be used to evaluate any set of occupational attributes from any source for which there exist data that are specific to a set of occupations and for which work history dates are available. For example, the method could be used to evaluate and adjust occupational attributes relating to scores on cognitive or other work-related tests (e.g., the WorkKeys™ tests from ACT, Inc.), responses to personality questionnaires, educational achievement measured by years in school, or other criteria that are deemed to relate to occupational performance.

Mathematical Steps for Analyses 1 and 2 Applied to O*NET Data

The algorithm described herein, when implemented on a computer, computes a Composite O*NET Profile (COP) of any individual based on his or her personal work history. Once so computed, an individual's COP is passed to the TORQ algorithm which treats the COP data values just as it would the data values of a standard O*NET™ occupation. For example, a “standard” occupation is an occupation present in the O*NET database, e.g., Chief Executives which bears the O*NET-SOC code of 11-1011.00. The result for an individual worker is a set of TORQ scores measuring the transferability of that worker to any standard O*NET occupation, based on the Knowledge, Skills and Abilities accumulated and retained in the course of his/her personal work history.

The O*NET database contains data on a large number of occupations. The circa November, 2011 version of the O*NET database is called O*NET 16. There exist 1,109 occupational codes and titles in O*NET 16. The database contains Data Values for 862 of these 1,109 occupations. Those data consist of multiple sets of worker characteristics such as Knowledge, Skills, Abilities, and others. Each of these worker characteristics is composed of a set of defined elements. For example, the O*NET worker characteristic category “Knowledge” currently consists of 32 separate elements or bodies of knowledge, such as “Computers and Electronics” or “Biology.” Similarly, the O*NET category for “Skills” includes 35 elements, such as “Active Learning” and “Programming,” while the category for “Abilities” currently includes 52 elements, such as “trunk strength” and “oral comprehension.” In the current O*NET 16 database, the worker characteristics categories of Knowledge, Skills and Abilities together include 119 elements.

Within the O*NET framework, each element of Knowledge, Skills, or Abilities is rated on two scales:

-   -   1. The first scale is “Level” which is abbreviated as “LV”         indicating the degree of the element required by the occupation.     -   2. The second scale is “Importance” which is abbreviated as “IM”         which indicates how important that element is to successful         performance of the tasks associated with that occupation).

For most standard occupations in the O*NET database, there exist “Data Values” for these Level and Importance scales. In the cases of Knowledge, Skills and Abilities, each element of each occupation is assigned two data values, one each for the Level and Importance of this element that may be required to perform this occupation. They are defined as:

-   -   A “Level” Data Value: L_(l) ^(o)         -   where “o” denotes a specific standard O*NET occupation and             “l” denotes a specific element.         -   An Example For the occupation entitled “Chief Executives,”             the data value for “LV” for the element “Computers and             Electronics” is given as 3.6 in the O*NET 16 database on a             scale that runs from 1 to 7.     -   An “Importance” Data Value: i_(l) ^(o)         -   where “o” denotes a specific standard O*NET occupation and             “l” denotes a specific element.         -   An Example For the occupation entitled “Chief Executives,”             the value of “IM” for the element “Computers and             Electronics” is given as 2.91 in the O*NET 16 database on a             scale that runs from 0 to 5.             All Data Values are positive real numbers.             Standardization of Data Values

As noted above, the LV (Level) and IM (Importance) scales each have a different range of possible scores. Ratings on Level are rendered in O*NET originally on a 0-7 scale, ratings on Importance they are rendered originally on a 1-5 scale. To make reports generated by O*NET more intuitively understandable to users, these ratings may be standardized to a scale ranging from 0 to 100. The equation for conversion of original ratings to standardized scores is: S((O−L)/(H−L)*100 where S is the standardized score, O is the original rating score on an original scale, L is the lowest possible score on the rating scale used, and H is the highest possible score on the rating scale used. For example, an original Importance rating score of 3 is converted to a standardized score of 50 (50=[[3−1]/[5−1]]*100). For another example, an original Level rating score of 5 is converted to a standardized score of 71 (71=[[5−0]/[7−0]]*100).

The standardization equation provided here preserves the rank ordering and proportional positioning of Data Value scores. This is an essential attribute of any proper transformation. Let it be noted, however, that the COP algorithm described in this document works equally well with the original O*NET Data Value scores or with any transformation thereof. That means that the claim herein stands independently of any standardization or transformation of the original O*NET Data Value scores.

The Procedure and Algorithm of Computing a Composite O*NET Profile (COP)

TORQ's Composite Algorithm (CA”) is a method for building a set of occupational characteristics that reflect the “work history” of a specific individual. It does this by evaluating and amalgamating the sets of requirements (i.e., the various sets “R”) of all the occupations in the individual's work history.

Decay: In evaluating each of the elements, r_(l) ^(k)εR^(k), attending a specific occupation, Aε0, it is necessary to determine the degree to which an individual's proficiency may have deteriorated over the time that has elapsed since the individual was last occupied in occupation A. Consequently the CA applies one of several proprietary “element decay factors” or “EDFs” to reflect this deterioration.

Restore: TORQs' CA recognizes merit in the old adage that “practice makes perfect.” That recognition underlies the “element restore factors” or “RSFs” that apply to each of the elements, r_(l) ^(k)εR^(k), attending a specific occupation, Aε0. The RSFs are functions of the duration of time that the worker was occupied in each occupation in which he/she was employed for some specific period in the past. Within the CA, the RSFs operate to restore or recover some portion of the decay due to the application of the EDFs.

Aggregation and standardization: After the EDFs and RSFs have been applied to each of the elements, r_(l) ^(k)εR^(k), that attend each of the occupations in the individual's work history, the modified elements are aggregated to form a standardized composite profile of occupational characteristics that reflect that work history.

Submission to TORQ: The composite profile for the individual worker, obtained via the steps just outlined, is submitted to the TORQ algorithm for analysis just as if it were a conventional occupation in the set O. The results obtained from that analysis, however, correspond much more closely to the attributes possessed by the individual than would be the case if only a single current or most recent occupation were the point of analytical departure.

O*NET or WorkKeys . . . or both? In the current TORQ application, the composite profiles are developed on the basis of the O*NET database. However, there is no reason why the same proprietary algorithm could not be employed using WorkKeys data. Since individual assessment is an important component of the WorkKeys methodology, the assessment route could be a more accurate path to a result to match the attributes of a specific individual. O*NET-based CA works in combination with WorkKeys job profiling and assessment in delivering powerful tools for use by HR and other hiring managers in both the private and public sectors.

Preparatory Step 1: Compute the “Decay Factors” for all Elements

This step of the algorithm is taken before any COPs are generated. It is taken only once “in the background” for each version of the O*NET database.

Determine the Decay Function (“E”) for each of the 119 elements that are scored in the O*NET database. For any given element the function is denoted generally as: E _(l) ^(s)=ƒ_(l) ^(s)(T)

-   -   where T is a positive integer variable denoting elapsed time         measured in days, months, years or other standard measure of         time; and     -   where s denotes the Level or Importance value; and     -   where l=1 . . . n with n denoting the total number of all         elements in all the descriptors in the O*NET database being         analyzed.     -   The computed values for E_(l) ^(s) are stored in TORQ's         computerized database for later reference.

For example, if the data being analyzed were to comprise only Knowledge, Skills and Abilities, then n=(i+j+k)=52+35+32=119 in the current version of the O*NET database, i.e., O*NET16. However, this algorithm works for any data describing an attribute related to occupational performance that may change over time.

The function ƒ_(l) ^(s) may be of any form including (without limiting the generality of the claim) linear, exponential, logarithmic, or the inverse of any of those. The determination of the form of the function ƒ_(l) ^(s) and the values of any constants and parameters therein are determined by the application of expert analysis.

The logical purpose of developing the Decay Factors E_(l) ^(s) for all data values in all elements is to reflect either the erosion of the worker's competencies, e.g., skills, or the decline in the relevance of those skills because of changing tools or technology, either of which may occur when that worker has been away from a particular occupation for a given time period. The pace of such erosion may differ individually for each element.

A numerical example of the decay function may help to clarify.

Consider the “Level” of the element “Programming.”

Suppose that ƒ_(l) ^(s)(T) takes the specific form of ƒ_(l) ^(s)(T)=T⁰e^(λT) which is a form familiar as that which describes the radioactive decay of an isotope over time.

Where T is elapsed time, and where

T⁰ is where elapsed time equals zero, and where

e denotes the natural logarithm, and where

λ is the “coefficient of decay.”

Suppose, further, that the coefficient of decay, λ, for Programming is taken to equal −0.09 Plugging those values into the equation ƒ_(l) ^(s)(T)=LV⁰e^(λT) gives a the set of computed values for E_(l) ^(s)=ƒ_(l) ^(s)(T) that are shown in FIG. 4: Graph 1. This graph shows the percent of the original LV that has decayed after the passage of T years which are measured along the X axis. From Graph 1, it is shown that, given the form of the function and the value of −0.09 assigned to λ (i.e., the “coefficient of decay”), half of the original LV score for Programming would have decayed in 7.70 years. Preparatory Step 2: Compute the “Restore Factors” for all Elements and all Scale ISs

This step of the algorithm is taken before any COPs are generated. It is taken only once “in the background” for each version of the O*NET database.

Determine the Restore Function (“R”) for each data value for all elements. For any given element descriptor, the function “R” can be denoted generally as: R _(l) ^(s) =g _(l) ^(s)(V) where V is a positive integer variable denote in time measured in days; and where s denotes the element data value; and where l=1 . . . n with n denoting the total number of all elements in the database being analyzed.

The function g may be of any form including (without limiting the generality of the claim) linear, exponential, logarithmic, or the inverse of any of those. The determination of the form of the function g and the values of any constants and parameters therein are determined by the application of expert analysis.

The logical purpose of developing the Restore Factors is to recognize and “give credit” to a worker for the proficiency developed by practicing a given occupation for a shorter or longer period of time. It recognizes the principle of “practice makes perfect.” The action of each Restore Factor “R” is to recover some of what has been lost by application of the Decay Function. The pace of such restoration may differ individually for each element.

A numerical example of the Restore Function may help to clarify.

Consider the “Level” of the element “Programming.”

Suppose that g_(l) ^(s)(V) takes the specific form of g_(l) ^(s)(V)=1−(V⁰÷β^(V))

Where V is duration of time working in an occupation, and where

V⁰ is where duration of time equals zero, and where

β is the “coefficient of restoration.”

Suppose, further, that the coefficient of restoration, β, for Programming is taken to equal 1.15

Plugging those values into the equation g_(l) ^(s)(V)=1−(V⁰÷β^(V)) gives a the set of computed values for R_(l) ^(s)=g_(l) ^(s)(V) that are shown in FIG. 5, Graph 2. This graph shows the percent of the decayed value of LV that will be “restored” by the algorithm after the passage of V years on the job which are measured along the X axis. From Graph 2, it is shown that, given the form of the function and the value of 1.15 assigned to β (i.e., the “coefficient of restoration”), half of the original amount of the decayed LV score would be “restored” in 4.96 years.

These computed values for R_(l) ^(s) are stored in TORQ's computerized database for later reference.

Application Step 1: Input the Individual's “Work History.”

This step is performed each time that an individual worker employs TORQ and wishes it to incorporate his/her COP, i.e., to recognize the competencies that he/she may have accumulated while performing more than a single occupation.

To compute an individual's COP, the algorithm requires the input of that individual's “Work History.” The Work History comprises a listing of one or more occupations that the individual holds now or has held in the past.

The algorithm requires that the individual should enter at least one such occupation in his/her work history. Typically, that will be an occupation in which the individual is now occupied or has recently been occupied if he/she is now unemployed. Optionally, the individual may enter additional occupations that he/she holds or may have held in the past.

The Work History also requests entries for the dates at which the individual began to work in each occupation listed (“Begin date”). If the individual is no longer employed in the occupation, then the Work History also includes the date at which employment in that occupation ceased (“Stop date”). The Begin and Stop dates must include, at a minimum, the year in which employment in the occupation began and ceased (if it has ceased). It may also include the day and month for each.

Application Step 2: Compute the Time Elapsed

The algorithm next computes the Time Elapsed for this individual since employment ceased in each occupation listed in the work history.

Denote as follows:

-   -   T⁰ is the date at which the COP is being prepared and the         algorithm being run.     -   B^(p) s the Begin date for occupation “p” (All dates are         converted into integer format. Conventionally, this is done by         computing the number of days elapsed since Jan. 1, 1900. Thus,         the date for Jan. 1, 1900 is rendered as “1” while Nov. 4, 2011         is rendered as “40850.”)     -   S^(p) is the Stop date (note that if the individual is still         employed in the occupation “p”, then this is the present date).     -   E^(p) is the time elapsed since employment ceased in each         occupation and         E ^(p) =T ⁰ −S ^(p)         Application Step 3: Compute the Duration on the Job

The algorithm next computes the Duration that the individual was on the job for each occupation in the work history.

Denote Duration on the job for occupation “p” as D^(p) Then, D ^(p) =S ^(p) −B ^(p) Application Step 4: Retrieve the Data Values

Look up from the O*NET database the Data Values for each element of all descriptors for each occupation the individual's Work History.

For example, the O*NET original “Level” Data Value for Skills element “Judgment and Decision Making” for the occupation “Chief Executives” (Code 11-1011.00) is 5.625.

Standardized as described earlier in this document, that score becomes 80.36. Comparable Data Values would be looked up for each of the other 118 elements shown in the O*NET16 database for this occupation. The same would be done for each occupation in the individual's Work History.

Application Step 5: Apply the Decay Factors

Apply the Decay Factors to the Data Values of each Scale ID score for each element in each occupation in the Work History to produce the Raw Decayed scores.

For every Data Value for each element in each occupation included in the Work History, this is done by looking up the previously computed and stored value for E_(l) ^(s)=ƒ_(l) ^(s)(T) where T is set equal to E^(p). That looked-up number is the percentage of the original O*NET Data Value (ODV) lost due to decay. The amount of that loss is E_(l) ^(s) times ODV and that loss is symbolized as LDV.

The result of applying the Decay Factors is a vector “R” containing LDVs for every element in each occupation in the individual's Work History. For example, if the characteristics being considered included only Knowledge, Skills and Abilities and only “Level” Data Values were being decayed, then the vector R would include 119 LDVs.

Application Step 6: Apply the Restore Factors to Produce a Set (Vector) of Net Adjusted Data Values.

Apply the Restore Factors to the LDVs scores to determine how much of the “decay” should be “restored” due to the individual worker's longevity in the job in each occupation. For every Data Value of each Scale ID for each element in each occupation included in the Work History, this is done by looking up the previously computed and stored value for R_(l) ^(s)=g_(l) ^(s)(V) where V is set equal to D^(p) and adjusting the Raw Decayed Score to produce the Net Adjusted Data Value (NADV) according to the following equation: NADV=ODV−LDV(1−R _(l) ^(s))

The NADVs comprise a vector N. Continuing our previous example, if the characteristics being considered included only Knowledge, Skills and Abilities and only “Level” Data Values were being decayed, then the vector N would include 119 NADVs.

After this step is completed for each occupation, the computed values of the NADVs are then stored in TORQ's computerized database.

Application Step 7: Select the Maximum Values of the NAVDs

At this point, the TORQ computerized database has a set of NADV vectors, each containing the Net Adjusted Data Values for each element in each occupation included in the Work History.

The final step in preparing the COP for an individual is to select the maximum NAVD for each element. That set of maximum scores comprises the Composite O*NET Profile (COP) for the specific individual whose personal work history has been submitted to the algorithm described herein.

Examples of the Results of Analyses 1 and 2

The impacts of these analyses to the statistical methods described in patent application Ser. No. 12/318,374 may be seen in a set of hypothetical examples comparing three job seekers using the TORQ algorithms. All three have been retail sales clerks. One (called Ann) has held only one job in retail sales and holds it currently. The second (Beth) is also currently a retail sales clerk, but has also recently held jobs as a home health aide, and an occupational therapist aide. The third (Carol) has held the same jobs as Beth, but has been out of the workforce for the past 7 years raising her children. When these employment histories are entered into the TORQ algorithm, the occupations and opportunities suggested by the algorithm vary substantially.

Ann (Recent experience only in retail sales) Grand Median Occupation Title TORQ Wage Retail Salespersons 100 Telemarketers 95 $23,027 Customer Service Representatives 92 $30,696 Counter and Rental Clerks 92 $26,798 Receptionists and Information Clerks 92 $24,747 Telephone Operators 91 $28,193 Mail Clerks and Mail Machine Operators, 91 $24,403 Except Postal Service Demonstrators and Product Promoters 91 $24,197 Filters applied: [Grand TORQ (80-100)x][Median Wage ($22k-$33k)x] 48 occupations found on the short list

Beth (Recent experience in retail, occupational therapy and home health) Grand Median Occupation Title TORQ Wage Retail Salespersons 100 Skin Care Specialists 97 $29,518 Telemarketers 97 $23,027 Customer Service Representatives 96 $30,696 Counter and Rental Clerks 96 $26,798 Physical Therapist Aides 96 $23,716 Occupational Therapist Aides 96 Weighers, Measurers, Checkers, 95 $29,728 and Samplers, Recordkeeping Receptionists and Information Clerks 95 $24,747 Filters applied: [Grand TORQ (80-100)x][Median Wage ($22k-$33k)x] 99 Occupations found on the short list

Carol (Experience in retail sales, home health and occupational therapy aide, but out of the workplace for 7 years) Grand Median Occupation Title TORQ Wage Retail Salespersons 87 Mail Clerks and Mail Machine 92 $24,403 Operators, Except Postal Service Skin Care Specialists 91 $29,518 Weighers, Measurers, Checkers, and 90 $29,728 Samplers, Recordkeeping Telemarketers 90 $23,027 Customer Service Representatives 89 $30,696 Medical Records and Health 89 $30,638 Information Technicians Counter and Rental Clerks 89 $26,798 Receptionists and Information Clerks 88 $24,747 Filters applied: [Grand TORQ (80-100)x][Median Wage ($22k-$33k)x] 55 Occupations found on the short list

These examples demonstrate that capturing the Knowledge, Skills and Abilities of multiple past occupations expands the array of occupations that are highly rated by the algorithm as feasible transfers. In addition, capturing time spent in the occupation and time away from the occupation has an impact on the ratings of the feasibility of occupational transfers. Thus, Ann, whose only occupational experience is her current job in retail sales, has fewer highly rated potential transfers compared with Beth, who has recent experience in multiple occupations. On the other hand, Carol, whose job history is identical to Beth's, but who has not performed these occupations for many years, is scored lower by the TORQ algorithm evaluating the feasibility of transfers to other occupations.

In summary the Level values for each element of each occupation may be adjusted based on the length of time the individual worked in the occupation, and by the period of time since the individual last actively performed the occupation to reflect the degree to which the attribute can be assumed still to characterize the individual. For example a computer programmer with five years experience may be assumed to have mastered programming skills (captured in O*NET as the “programming” skill) to a greater degree than one who has been a computer programmer for six months. Similarly, a computer programmer who has not been employed in that occupation for five years may be assumed to have lower levels of programming competency than an individual who is currently employed as a programmer. By selecting the highest value for each adjusted element value after considering these factors relating to time, an individual's overall profile of KSA elements can be assembled. Then, a comparison between an individual's element Level scores and the O*NET element Level scores required for a given occupation, can provide a mathematical evaluation of the feasibility of the individual successfully performing that given occupation.

Analysis 3

A method for the statistical evaluation of groups of workers based on evaluating and combining the skill sets and other relevant attributes of all of the workers in a geographic area, industry, or other grouping, based on the occupations that these workers currently, or most recently held.

The method for statistical evaluation of the Knowledge, Skills and Abilities of individual workers can be applied to groups of workers. If the number of workers currently (or recently) employed in each occupation within any group is known, then the data values for worker attributes derived by the TORQ algorithm for individuals can be summed across any relevant group or sub-group of workers to describe the overall characteristics of that group, and to compare that group with other groups.

As described below, Analysis 3 is applied to data from the US Department of Labor O*NET databases that describe the Knowledge, Skills and Abilities of each occupation for specific geographical subdivisions of the US. The statistical method described in Analysis 3 can be used to evaluate any set of occupational attributes from any source for which there exist data that are specific to a set of occupations, and to evaluate any group or subgroup of workers for whom occupations are known and attribute data values for each occupation are known.

Mathematical Steps for Analysis 3 Applied to O*NET Data

The algorithm described in this claim, when implemented on a computer, describes a Talent Quality Index (TQI) of any state or region (hereafter, “area”) in the United States for which detailed occupational employment data are available. Without limiting the generality of this claim, an example of such a data set would be the annual occupational employment data produced by the Occupational Employment Survey (OES) that is conducted annually by the U.S. Bureau of Labor Statistics (BLS) and/or the state-level agencies responsible for the collection of labor market information (LMI). Once computed, an area's TQI can be the basis for computing several relevant comparisons. Examples of these comparisons, without limiting the generality of the claim, include:

-   -   Comparisons of the TQIs of any given geographical area with the         TQIs of other areas (cross-geographical comparisons);     -   Comparisons of the TQIs of a given area at one point in time         with the TQIs of that same area at other points in time         (inter-temporal comparisons);     -   Comparisons of the TQI of a given area at one point in time         (e.g., the most recent year for which the aforesaid occupational         employment data are available) with the TQI implied by the         projected occupational employment for some future year;     -   Comparisons of the TQI of a given area at one point in time         (e.g., the most recent year for which the aforesaid occupational         employment data are available) with the TQIs implied for one or         several industries or clusters of industries for which         occupational employment data are available.     -   Comparisons of the TQI associated with one portion of a given         area's workforce (e.g., the unemployed, or those occupations         that have declined in size over a particular period) with         another portion of that same area's workforce (e.g., those still         employed, or those occupations that have grown in size over a         particular period).

Additionally covered by this claim is the ranking of areas within a set of areas according to their TQIs. Thus, without limiting the generality of the claim, all of the states can be ranked according to their TQIs. The same is true of Metropolitan Statistical Areas (MSAs) as defined by the U.S. Census Bureau.

The data necessary for the computation of the TQI of any area are, in addition to detailed occupational data as specified above, a set of descriptors of qualitative requirements or desirable characteristics to match each of the occupations entering into the TQI calculation. An example of such a set of descriptors, without limiting the generality of this claim, would be the Level scores for Knowledge, Skills, and Abilities that are provided for each occupation in the O*NET™ database.

A Concrete Illustration of the TQI Algorithm

To provide concrete illustration of the TQI algorithm, but without limiting the generality of the claim, here is a descriptive example of the TQI algorithm that is based on data contained in the O*NET database and the OES data from the BLS.

The Procedure and Algorithm for Computing the TQI

Terminology:

For the United States as a whole (“the nation”) in year “y” there are employment data on “^(y)n_(u)” detailed occupations. Then let:

-   -   E_(i) ^(y,u) denote the number of persons employed nationally in         occupation “i” in year “y” where i=1 . . . ^(y)n_(u).         For each sub-national area “s” in year “y” there are employment         data on “^(y)n_(a)” detailed occupations. Then let:     -   E_(j) ^(y,a) denote the number of persons employed in area “a”         in occupation “j” in year “y” where j=1 . . . ^(y)n_(a).

Each occupation in the OES databases for all areas is coded according to a common coding system, the “Standard Occupational Code” (SOC).

For most occupations in the O*NET database, there exist two “Data Values” for each element of Knowledge, Skills and Abilities. These are:

-   -   A “Level” Data Value: L_(l) ^(o)         -   where “o” denotes a specific O*NET occupation and “l”             denotes a specific element.         -   An Example For the occupation “Chief Executives,” the “LV”             for the element “Computers and Electronics” is given as 3.6             in the O*NET 16 database on a scale that runs from 1 to 7.     -   An “Importance” Data Value: l_(l) ^(o)         -   where “o” denotes a specific orthodox O*NET occupation and             “l” denotes a specific element.         -   An Example: For the occupation entitled “Chief Executives,”             the element “Computers and Electronics” is given as 2.91 in             the O*NET 16 database on a scale that runs from 0 to 5.

All Data Values are positive real numbers.

Step 1: Compute the Weighted KSA Average for the United States

-   1.1 Download or otherwise obtain and store the most recent OES data     from the BLS.     Illustration: For the 2010 OES data, that would be the “National     Cross-Industry” table, i.e., the list below:     Current Tables: May 2010 estimates     -   National Cross-Industry     -   State Cross-Industry     -   Metropolitan and Nonmetropolitan Area Cross-Industry     -   Metropolitan and Nonmetropolitan Area Estimates listed by         country or town     -   National sector, 3-, 4-, and 5-digit NAICS Industry-Specific     -   National by Ownership     -   List of occupations in alphabetical order -   1.2 Download and store the most recent O*NET database. -   1.3 Retrieve from storage the previously obtained National     Cross-Industry data OES data (the “national data”). For each     SOC-coded occupation, that file will contain E_(i) ^(y,u). Example:     For 2010 OES, that will be the set E^(2010,u) such that E_(i)     ^(2010,u)εE^(2010,u) for all i=1 . . . 796 (i.e., for all detailed     occupations). The 2010 OES occupational employment data for the     first five detailed occupations are as shown the column headed “TOT     EMP” below:

OCC Code OCC Title Group TOT EMP 11-1011 Chief Executives 273,500 11-1021 General and Operations Managers 1,708,080 11-1031 Legislators 65,710 11-2011 Advertising and Promotions Managers 32,240 11-2021 Marketing Managers 164,590

-   1.4 Retrieve from storage the previously downloaded O*NET database.     From that database, extract the “Level” Data Value: L_(l) ^(o) for     all occupations in that database for the descriptors Knowledge,     Skills, and Abilities.     -   Example: The numbers for L_(l) ^(o) for the first five         occupations in O*NET 16 are as shown in the column labeled “Data         Value” in FIG. 6. -   1.5 Compute the “weighted average” of each element “l” of the     descriptors Knowledge, Skills and Abilities for the nation by     multiplying the Data Value for element “l” in each occupation by the     number of persons employed in each of the occupations, summing those     products, and then dividing that sum by the total number of persons     employed in all those occupations. Symbolically,

( WA ) l y , u = ∑ i N ⁢ ( E ⁢ i y , u × L l i ) ÷ ∑ i N ⁢ ⁢ ⁢ ( E ⁢ i y , u ] where N=^(y)n_(u), i.e., the number of detailed occupations in the national table of the particular year of OES being used and as defined earlier herein. For example, in OES 2010 that number would be 796.

-   -   When this computation is completed for all elements, the result         is a vector set of weighted averages of all the elements in the         descriptors Knowledge, Skills and Abilities. Sybolically, the         result is the set (WA)^(y,u) such that (WA)_(l) ^(y,u)ε(         WA)         ^(y,u). As an illustrative example, the case of O*NET 16, the         number of elements in the set (WA)^(y,u) would be 119.         Step 2: Compute the Weighted KSA Average for One or More of the         Sub-National Areas.

Compute the “weighted average” of each element “l” of the descriptors Knowledge, Skills and Abilities for each sub-national area j in a manner similar to that just described for the nation. That is by multiplying the Data Value for element “l” in each occupation in area j by the number of persons employed in each of the occupations in area summing those products, and then dividing that sum by the total number of persons employed in all those occupations in area j. Symbolically, for each,

$({WA})_{l}^{y,j} = {\sum\limits_{i}^{A,j}{\overset{\_}{\underset{\_}{(}}{\left( {E{\underset{\_}{\overset{\_}{)}}}_{i}^{y,j} \times L_{l}^{i}} \right) \div {\sum\limits_{i}^{A,j}{\underset{\_}{\overset{\_}{(}}\left( {E{\overset{\_}{\underset{\_}{)}}}_{i}^{y,j}} \right\rbrack}}}}}$

where (A, j)=^(y)a_(m) (as previously described) for the area j, i.e., the number of detailed occupations in the OES table for area j of the particular year of OES (or similar data from state LMI agencies or private sources) being used. That number varies from area to area and may vary from year to year for any given area.

When this computation is completed for multiple areas and all elements, the results comprise a matrix of weighted averages of all the elements in the descriptors Knowledge, Skills and Abilities for each of those multiple areas. That matrix would be of dimension K×L where K denotes the number of areas and L denotes the number of elements (119 in O*NET 16). Currently the OMB and Census Bureau number 362 MSAs and 577 Micropolitan Areas. This claim covers not only these areas but also any other geographical area for which detailed occupational data have been available, are available now or may become available in the future.

Step 3: Compute the Talent Quality Index for One or More of the Sub-National Areas.

The final step in computing the TQI for any given area j in a given year is to divide the weighted averages of all KSA elements in that area by the comparable weighted average of the nation as a whole. Symbolically, that is

(TQI)_(j, l)^(y) = (WA)_(j, l)^(y, a) ÷ (WA)_(l)^(y, u). Summary of TQI Analysis Steps:

Analytically, the TQI is useful in two main ways:

-   -   1. For workforce and/or economic development:         -   Assess the quality of an area's workforce in terms of its             Knowledge, Skills and Abilities. These, of course, are O*NET             categories. However, it is possible to apply the same TQI             methodology on the basis of area employment estimates and             WorkKeys job profiles.         -   Identify the strengths and weaknesses of an area's             workforce;         -   Compare an area's workforce quality with that of other areas             in the nation;         -   Benchmark an area's workforce to what's needed to achieve             defined economic development targets;         -   Evaluate how an area's workforce quality is changing over             time;         -   Match different areas' workforce quality against target             industries or clusters.     -   2. For site selectors or companies seeking areas in which to         locate or expand operations:         -   Evaluate which of several different areas posses talent             mixes that well correspond to that needed by a client             company or the operation in question.

At its core, TORQ's Talent Quality Index (TQI) is a variation on what is commonly known as “Location Quotient Analysis” (or “LQA”). LQA is commonly used in regional economics to explicate the relative concentration of various industries in some particular area. TORQ's TQI redirects the analysis to focus on the relative concentration of various workforce attributes (r_(l) ^(k)εR^(k)) in each region. TORQ's proprietary TQI algorithm presently operates with jurisdictional employment data together with O*NET KSA data in the following manner:

Posit that there are n occupations in U (the entire nation) among which all workers are distributed such that each worker is counted in one and only one occupation. Suppose, further, that there exist proper subsets of those occupations in all areas of interest (states, metro area, etc.).

-   -   I. Then let:     -   II. U^(i) denote the number of workers in the i^(th) occupation         in the entire nation. i=1 . . . n     -   III. S_(j) ^(i) denote the number of workers in the i^(th)         occupation in the j^(th) state. i=1 . . . n; J=1 . . . 51     -   IV. M_(l) ^(i) denote the number of workers in the i^(th)         occupation in the metro area i=1 . . . n; l=1 . . . 394     -   V. In O*NET™ 15 database, there exist, for each of the n         occupations, the following: 32 “Knowledge elements;” 35 “Skills         elements;” and 52 “Ability elements;”.” Furthermore,         corresponding to each of these “elements” there exists a range         of numeric “Values” that may range from 0 to 100.     -   VI. Then let:     -   VII. V_(k) ^(i) denote the value of the k^(th) Knowledge element         of the i^(th) occupation. k=1 . . . 32     -   VIII. V_(s) ^(i) denote the value of the s^(th) Skills element         of the i^(th) occupation. s=1 . . . 35     -   IX. V_(a) ^(i) denote the value of the a^(th) Ability element of         the i^(th) occupation. a=1 . . . 52     -   X. Q_(k) ^(j) denote the TORQ Talent Quality Index of the k^(th)         Knowledge element for the j^(th) state. J=1 . . . 51     -   XI. Q_(s) ^(j) denote the TORQ Talent Quality Index of the         s^(th) Skills element for the j^(th) state. J=1 . . . 51     -   XII. Q_(a) ^(j) denote the TORQ Talent Quality Index of the         a^(th) Ability element for the j^(th) state. J=1 . . . 51     -   XIII. Q_(k) ^(l) denote the TORQ Talent Quality Index of the         k^(th) Knowledge element for the l^(th) metro area. l=1 . . .         394     -   XIV. Q_(s) ^(l) denote the TORQ Talent Quality Index of the         s^(th) Skills element for the l^(th) metro area. l=1 . . . 394     -   XV. Q_(a) ^(j) denote the TORQ Talent Quality Index of the         a^(th) Ability element for the l^(th) metro area. l=1 . . . 394     -   XVI. Then compute the TORQ Talent Quality Index for the jth         state and the kth Knowledge element as follows:     -   XVII.

$\sum\limits_{Q_{k}^{j} = {i = 1}}^{i = n}{\left\lbrack {(V\rbrack_{k}^{i}*S_{j}^{i}} \right) \div {\sum\limits_{i = 1}^{i = n}\left\lbrack {(V\rbrack_{k}^{i}*U^{i}} \right)}}$

-   -   XVIII. And compute the TORQ Talent Quality Indexes for all the         other all the areas and all the other elements in an analogous         manner.         Examples of the Outputs from Analysis 3

The table below summarizes an analysis of nine metropolitan areas using the TORQ Analysis 3 algorithm described above. It describes the set of Knowledge, Skills and Abilities of each metropolitan area compared to the set of Knowledge, Skills and Abilities required of workers in manufacturing industries. The table summarizes and ranks the workforces of each metro area based on whether its workforce is better or worse matched to the optimum set of Knowledge, Skills and Abilities needed in manufacturing.

Abilities Skills Knowledge Grand Metro Area TORQ TORQ TORQ TORQ Evansville, IN-KY 97 94 88 93 Rockford, IL 96 93 88 92 Green Bay, WI 96 93 86 92 Davenport-Moline- 95 92 86 91 Rock Island, IA-IL Peoria, IL 94 90 82 89 Champaign-Urbana, IL 93 90 80 88 San Jose-Sunnyvale- 90 86 86 87 Santa Clara, CA Bloomington-Normal, IL 91 86 82 86 Springfield, IL 92 87 78 86 NB: The measures of congruence are based on the TORQ ™ score of each region's workforce versus the target industry. TORQ ™ is a proprietary product of Workforce Associates, Inc.

By computing the total attribute values for populations, it is also possible to derive the deviations from these values that characterize subsets of these populations, based on the incidence of specific individual attributes (e.g., nursing skills) or groups of attributes (e.g., mathematical knowledge).

For example, mathematical summaries of the attributes of groups of workers or jobs may be used to:

-   -   Determine which location (city, region, nation) would have a         workforce with attributes most suited to the needs of a given         employer relocating to a new area;     -   Determine what educational investments may be needed in a         geographical region to attract employers from specific         industries;     -   Determine with precision the degree to which the population of         unemployed workers may differ from the requirements of jobs         available in a given area, and to prescribe specific remediation         or employment strategies.         The TORQ Algorithm         The Algorithm Itself:

TORQ is all about “transferability.” Here “transferability” is taken to be the ease (or difficulty) that a worker who is fully and exactly competent in one occupation (occupation “A”) would experience if he/she were to “transfer” to work in another occupation (occupation “B”). Here, both occupations “A” and “B” can be any two among a set of occupations (the set “O”) for which quantitative data exist describing the common requirements (the set “R”) for all occupations in O. Each member of R (i.e., R^(k)εR) may contain a sub-set r_(l) ^(k)εR^(k) of “elements” that comprise more granular measures of worker attributes.

The TORQ algorithm juxtaposes the aforementioned data on all elements of R for each and every pair of occupations (AεO and BεO) to produce:

-   -   a. A set of scores (s_(AB) ^(j)εS^(j)) that measures the degree         of transferability of workers in occupation A to occupation B         with reference to each of the j=1 . . . n requirements in R.         Colloquially, these are described as the “mini-TORQ scores.”     -   b. A weighted average

$G_{AB} = {\left( {\sum\limits_{1}^{n}{w_{j}s_{AB}^{j}}} \right) \div n}$ is computed to yield a “Grand TORQ” score.

-   -   c. A raw ranking of all occupations in A and B in O         corresponding to their G_(AB), i.e., according to their Grand         TORQ scores.     -   d. A filtering of the raw ranked Grand TORQ scores according to         a set of criteria to more narrowly focus the TORQ user's         attention on occupational transfers that meet other desiderata.         Alternatively, one or more of these other desiderata may be         included among the requirements, R, taken into account during         the calculation of the Grand TORQ score itself.     -   These may include for each of the occupations in O:         -   a. The level of education and experience required;         -   b. The various work activities, contexts, values and styles             normally attending each occupation;         -   c. The licenses and certifications required for in various             jurisdictions;         -   d. The level of compensation normally prevailing in the             user's locale;         -   e. The availability of job opening within user-defined             regions;     -   e. An analysis of the degree to which each r_(l) ^(k)εR^(k) of         the “From” occupation (i.e., occupation B in this example) may         fall short of that required for the “To” occupation (i.e.,         occupation A in this example). Colloquially, this is TORQ's “Gap         Analysis.” The identification of significant “gaps” can identify         specific elements among the requirements that warrant special         attention and/or assessment in the cases of specific         individuals. Similarly, Gap Analysis can point up areas of         deficiency which may be amenable to additional training and/or         education.         General Algorithm for Computing the Mini-TORQ Scores and then         the Grand TORQ Score

-   1. Within the O*NET database, there currently exist more than 850     occupations with required Data Values. In the general case,     -   let the number of occupations in the O*NET database be denoted         by the letter “m.”

-   2. For each of the m occupations, there exist three sets of worker     characteristics or requirements which are     -   a. A set of Abilities “elements.” Currently there are 52 of         these in the O*NET database but our claim stands independently         of the actual number there may be in any version of the         database.     -   b. A set of Skills “elements.” Currently there are 35 of these         in the O*NET database but our claim stands independently of the         actual number there may be in any version of the database.     -   c. A set if Knowledge “elements.” Currently there are 32 of         these in the O*NET database but our claim stands independently         of the actual number there may be in any version of the         database.     -   d. The word “Descriptor” is used as a generic term to denote any         one of the aforementioned three sets (Abilities, Skills and         Knowledge).     -   e. Our algorithm computes a “mini-TORQ” score for each         Descriptor. The same algorithm is employed for each of the three         Descriptors and it is that General Algorithm that is described         below and which this claim is intended to cover.

-   3. Each Descriptor element has two vectors of data:     -   a. A vector of “Level” scores: V_(i) ^(a)=1 . . . n,         -   i. where “n” is the number of elements pertaining to the             Descriptor in question (i.e., currently 52 for Abilities; 35             for Skills; and 32 for Knowledge)     -   b. A vector of “Importance” scores: l_(i) ^(a) i=1 . . . n     -   These scores are positive real numbers.

-   4. In TORQ, we typically analyze the pair-wise “transition” of     workers from a “FROM′” occupation to a “TO” occupation where both     the FROM and TO occupations may be any pair from among the 854 (or     whatever number of occupations there may be in the current version     of O*NET database).     -   Let:     -   ^(ƒ)V_(i) ^(a)=Level score of Descriptor element “I” for the         FROM occupation “f.”     -   ^(ƒ)l_(i) ^(a)=Importance score of Descriptor element “I” for         the FROM occupation “f.”     -   ^(t)V_(l) ^(a)=Level score of Descriptor element “I” for the TO         occupation “1 . . . t.”     -   ^(t)l_(l) ^(a)=Importance score of Descriptor element “I” for         the TO occupation “t.”     -   Where         -   i=1 . . . n;         -   t=1 . . . 854 (for O*NET 15); and         -   t=1 . . . 854 (for O*NET 15).

-   5. Product Vectors:     -   Fundamental to all TORQ computations are two types of vector         multiplications:         -   a. “To-To” vectors, one for each of the m occupations. Each             member of this vector is the product defined as follows:             TT _(i) ^(a)=^(t) VI _(i) ^(a)*^(t) I _(i) ^(a)         -   b. “From-To” vectors, one for each of the (m²−m) pairs of             i-to-j pair of occupations. Each member of this vector is             the product defined as follows:             FT _(i) ^(a)=^(f) V _(i) ^(a)*^(t) l _(i) ^(a)

-   6. Gap Vectors, one for each of the (m²−m) i-to-j pairs of     occupations. Each member of this vector is the product defined as     follows:     G _(i) ^(a) =TT _(i) ^(a) −FT _(i) ^(a)

-   7. Sum the Positive Gaps. Now, for each pair of occupations, compute     the sum of the positive gaps:

${\sum\limits_{i = {1\mspace{14mu}\ldots\mspace{14mu} n}}^{G_{i}^{a} > 0}G_{i}^{a}} = {\sum\limits_{i = {1\mspace{14mu}\ldots\mspace{14mu} n}}^{> 0}\left\lbrack {\left( {}^{t}{V_{i}^{a}*^{t}I_{i}^{a}} \right) - \left( {}^{f}{V_{i}^{a}*^{t}I_{i}^{a}} \right)} \right\rbrack}$

The step of aggregating the resulting values comprises computing the value of the Level times the value of the Importance of each worker attribute, and comparing these computed products for each attribute between any pair of occupations. The differences between occupations for these computed products for each attribute, which could be called skill gaps, are summed for all attributes of any two occupations to produce a single value summarizing the total difference between the sums of all the computed products, provided that each difference for two computed products for a given attribute is only considered and added to the sum of the gaps between any two occupations to the extent that the computed product for the target occupation exceeds the computed product of the source occupation. This method of ignoring higher source computed product values prevents “over-qualification” on one attribute from compensating for under-qualification on another.

A graphical representation of this method describes the area of skill gap under the curve of the attribute values of the target occupation. Thus in FIG. 7, if the Series I line represented the attribute scores of the source occupation, and the Series 2 line represented the attribute scores of the target occupation, the sum of the gaps number 1-4 between the Series 1 line and the Series 2 line would be the total skill gap. If the transition were from the Series 2 occupation to the Series 1 occupation, gaps 5 and 6 would be summed to represent the total skill gap between the red source occupation and the blue target occupation.

This type of gap analysis is an important supplement to the use of correlation coefficients, because it reflects more accurately the difficulty of acquiring more advanced skills in occupations that may have similar patterns of skills. For example, a doctor and a nurse may have highly correlated sets of Knowledge and Abilities, but the levels of each attribute may vary greatly. So a pure correlation based analysis of the skills required to move from being a nurse to being a doctor might suggest a very easy transition. But in fact, while it is generally feasible for a doctor to become a nurse, the opposite transition may require many additional years of study and certification, as shown by gap analysis.

-   8. Form the “Weakness” Ratio. For each pair of occupations, compute     the “Weakness” Ratio defined as follows:

$\;^{f}W_{a}^{t} = {\sum\limits_{i = {1\mspace{14mu}\ldots\mspace{14mu} n}}^{G_{i}^{a} > 0}{G_{i}^{a}/{\sum\limits_{i = 1}^{i = n}{TT}_{i}^{a}}}}$

-   9. Coefficient of “Strength:” This is the Descriptor “Strength” of     occupation “f” to transition to occupation “t” and computed as     follows:     ^(ƒ) S _(a) ^(t)=1−^(ƒ) W _(a) ^(t) -   10. Compute the Correlation Coefficient, also known as the “Pearson     product-moment correlation coefficient” and is defined as the     covariance of the two variables divided by the product of their     standard deviations, as follows:     ^(ƒ) CC _(a) ^(t)=CORREL(VectorTT ^(a):VectorFT ^(a)) -   11. Finally, calculate the Descriptor TORQ for occupation f to     occupation t as”     TORQ_(ƒ to t) ^(a)=[(x _(a)*^(ƒ) CC _(a) ^(t))+((y _(a)*^(ƒ) S _(a)     ^(t))]/((^(x) _(a) +y _(a))     -   Where x_(a) and y_(a) are both ≧0 and ≦1 but (x_(a)+y_(a))=1. -   11. The choice of x_(a) and y_(a) obviously are the weights assigned     to the Correlation Coefficient and the Strength Coefficient     respectively. -   12. The mini TORQs for Abilities, Skills and Knowledge are computed     analogously to that explained here for “Descriptor.” -   13. The three mini-TORQ scores are averaged to form the “Grand TORQ”     score for every one of the (m²−m) “From-To” pairs of “m” occupations     included in the current set of O*NET occupations. That average may     be “weighted” by multiplying “weights” to each of the mini-TORQ     scores and then summing the products thereby derived. The “weights”     may or may not be equal to one another but each of them must be     positive, less than or equal to 1, and their sum must equal one (1).

While illustrative embodiments of the invention have been described herein, the present invention is not limited to the various preferred embodiments described herein, but includes any and all embodiments having equivalent elements, modifications, omissions, combinations (e.g., of aspects across various embodiments), adaptations and/or alterations as would be appreciated by those in the art based on the present disclosure. The limitations in the claims are to be interpreted broadly based on the language employed in the claims and not limited to examples described in the present specification. 

The invention claimed is:
 1. A method for computing a correlation coefficient for a pair of occupations as an indication of transferability of workers between the occupations comprising: providing a computer to perform computations; selecting the pair of occupations; for each occupation in a set of occupations: entering into a matrix or database a set of scores for a selected individual worker attribute for an occupation, the set of scores for each attribute being one or more sets S^(k) consisting of N^(k) scores, where S^(k)

x_(j) (j=1, 2, . . . N^(k)); computing, with the computer, a product of an Importance score and a Level score for the attribute to produce a composite attribute value; entering the composite attribute value into the matrix; computing the difference between the computed product for each attribute between any pair of occupations; computing the sums of all differences between the computed product for each attribute between any pair of occupations to equal the total difference; entering the total difference value into the matrix; accessing, with the computer, data in the matrix; computing, with the computer, a correlation coefficient for the pair of occupations by correlating the composite attribute value for the pair of occupations by the following formula: ${{Correl}\left( {X,Y} \right)} = \frac{\sum\limits_{i}^{N^{k}}\left\{ {\left( {x_{i} - \mu_{x}} \right)\left( {y_{i} - \mu_{y}} \right)} \right\}}{\left\lbrack \sqrt{\sum\limits_{i}^{N^{k}}{\left( {x_{i} - \mu_{x}} \right)^{2}{\sum\limits_{i}^{N^{k}}\left( {y_{i} - \mu_{y}} \right)^{2}}}} \right\rbrack}$ wherein: X and Y represent two vectors in a set, S^(k), of scores for the x^(th) and y^(th) occupations in a set of occupations; where both x and y run from 1 to N, where N is the number of occupations in the set of occupations and x and y are composite attribute values assigned to each occupation; k is a value indicating a Level assigned to an individual worker attribute; x_(i) ^(a)X; y_(i) ^(a)Y; i=1, 2, . . . N^(k); $\mu_{x} = \frac{\sum\limits_{i}^{N^{k}}\left\{ x_{i} \right\}}{N^{k}}$ is the mean value of the X vector and $\mu_{xy} = \frac{\sum\limits_{i}^{N^{k}}\left\{ y_{i} \right\}}{N^{k}}$ is the mean value of the Y vector normalizing the correlation coefficients on a scale of 1 to 100; adjusting the normalized correlation coefficients by producing a ratio whereof the numerator is calculated as the sum of the differences between the members of each pair of the composite Level-Importance scores for two selected occupations, the two selected occupations being a source occupation and a destination occupation, for which the composite Level-Importance scores for the destination occupation exceed the composite Level-Importance scores for the source occupation, and the denominator is calculated as the raw sum of the composite Level-Importance scores of the destination occupation; and adjusting the correlation coefficients, with the computer, for each composite attribute by averaging it with the produced ratios; and producing a report of the correlation coefficients for all pairs of occupations in the set to indicate transferability of workers, indicated by a value of the correlation coefficients, between the occupations, wherein a mathematical summary of Level values of work relevant attributes of the individual worker are compiled and adjusted based on multiple occupations that the individual worker performed.
 2. A method for computing a correlation coefficient for a pair of occupations as an indication of transferability of workers between the occupations comprising: providing a computer to perform computations; selecting the pair of occupations; for each occupation in a set of occupations: entering into a matrix or database a set of scores for a selected individual worker attribute for an occupation, the set of scores for each attribute being one or more sets S^(k) consisting of N^(k) scores, where S^(k)

x_(j) (j=1, 2, . . . N^(k)); computing, with the computer, a product of an Importance score and a Level score for the attribute to produce a composite attribute value; entering the composite attribute value into the matrix; computing the difference between the computed product for each attribute between any pair of occupations; computing the sums of all differences between the computed product for each attribute between any pair of occupations to equal the total difference; entering the total difference value into the matrix; accessing, with the computer, data in the matrix; computing, with the computer, a correlation coefficient for the pair of occupations by correlating the composite attribute value for the pair of occupations by the following formula: ${{Correl}\left( {X,Y} \right)} = \frac{\sum\limits_{i}^{N^{k}}\left\{ {\left( {x_{i} - \mu_{x}} \right)\left( {y_{i} - \mu_{y}} \right)} \right\}}{\left\lbrack \sqrt{\sum\limits_{i}^{N^{k}}{\left( {x_{i} - \mu_{x}} \right)^{2}{\sum\limits_{i}^{N^{k}}\left( {y_{i} - \mu_{y}} \right)^{2}}}} \right\rbrack}$ wherein: X and Y represent two vectors in a set, S^(k), of scores for the x^(th) and y^(th) occupations in a set of occupations; where both x and y run from 1 to N, where N is the number of occupations in the set of occupations and x and y are composite attribute values assigned to each occupation; k is a value indicating a Level assigned to an individual worker attribute; x_(i) ^(a)X; y_(i) ^(a)Y; i=1, 2, . . . N^(k); $\mu_{x} = \frac{\sum\limits_{i}^{N^{k}}\left\{ x_{i} \right\}}{N^{k}}$ is the mean value of the X vector and $\mu_{xy} = \frac{\sum\limits_{i}^{N^{k}}\left\{ y_{i} \right\}}{N^{k}}$ is the mean value of the Y vector normalizing the correlation coefficients on a scale of 1 to 100; adjusting the normalized correlation coefficients by producing a ratio whereof the numerator is calculated as the sum of the differences between the members of each pair of the composite Level-Importance scores for two selected occupations, the two selected occupations being a source occupation and a destination occupation, for which the composite Level-Importance scores for the destination occupation exceed the composite Level-Importance scores for the source occupation, and the denominator is calculated as the raw sum of the composite Level-Importance scores of the destination occupation; and adjusting the correlation coefficients, with the computer, for each composite attribute by averaging it with the produced ratios; and producing a report of the correlation coefficients for all pairs of occupations in the set to indicate transferability of workers, indicated by a value of the correlation coefficients, between the occupations, wherein a Level value for each element of each occupation may be adjusted based on a length of time the worker worked in the occupation, and by a period of time since the worker last actively performed the occupation to reflect the degree to which the attribute can be assumed still to characterize the individual worker.
 3. A method for computing a correlation coefficient for a pair of occupations as an indication of transferability of workers between the occupations comprising: providing a computer to perform computations; selecting the pair of occupations; for each occupation in a set of occupations: entering into a matrix or database a set of scores for a selected individual worker attribute for an occupation, the set of scores for each attribute being one or more sets Sk consisting of N^(k) scores, where S^(k)˜xj (j=1, 2, . . . N^(k)); computing, with the computer, a product of an Importance score and a Level score for the attribute to produce a composite attribute value; entering the composite attribute value into the matrix; computing the difference between the computed product for each attribute between any pair of occupations; computing the sums of all differences between the computed product for each attribute between any pair of occupations to equal the total difference; entering the total difference value into the matrix; accessing, with the computer, data in the matrix; computing, with the computer, a correlation coefficient for the pair of occupations by correlating the composite attribute value for the pair of occupations by the following formula: ${{Correl}\left( {X,Y} \right)} = \frac{\sum\limits_{i}^{N^{k}}\left\{ {\left( {x_{i} - \mu_{x}} \right)\left( {y_{i} - \mu_{y}} \right)} \right\}}{\left\lbrack \sqrt{\sum\limits_{i}^{N^{k}}{\left( {x_{i} - \mu_{x}} \right)^{2}{\sum\limits_{i}^{N^{k}}\left( {y_{i} - \mu_{y}} \right)^{2}}}} \right\rbrack}$ wherein: X and Y represent two vectors in a set, S^(k), of scores for the x^(th) and y^(th) occupations in a set of occupations; where both x and y run from 1 to N, where N is the number of occupations in the set of occupations and x and y are composite attribute values assigned to each occupation; k is a value indicating a level assigned to an individual worker attribute; x_(i) ^(a)X; y_(i) ^(a)Y; i=1, 2, . . . N^(k); $\mu_{x} = \frac{\sum\limits_{i}^{N^{k}}\left\{ x_{i} \right\}}{N^{k}}$ is the mean value of the X vector and $\mu_{xy} = \frac{\sum\limits_{i}^{N^{k}}\left\{ y_{i} \right\}}{N^{k}}$ is the mean value of the Y vector; normalizing the correlation coefficients on a scale of 1 to 100; adjusting the normalized correlation coefficients by producing a ratio whereof the numerator is calculated as the sum of the differences between the members of each pair of the composite level-importance scores for two selected occupations, the two selected occupations being a source occupation and a destination occupation, for which the composite level-importance scores for the destination occupation exceed the composite level-importance scores for the source occupation, and the denominator is calculated as the raw sum of the composite level-importance scores of the destination occupation; and adjusting the correlation coefficients, with the computer, for each composite attribute by averaging it with the produced ratios; and producing a report of the correlation coefficients for all pairs of occupations in the set to indicate transferability of workers, indicated by a value of the correlation coefficients, between the occupations wherein a mathematical summary of numerical values of the work-relevant attributes of a given population of workers is created and, systematically compared with that of another population of workers. 